1590 lines
78 KiB
TeX
1590 lines
78 KiB
TeX
% RMS wrote:
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%The text does not mention GNU anywhere. This paper is an opportunity
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%to make people aware of GNU, but the current text fails to use the
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%opportunity.
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%
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%It should say that Taler is a GNU package.
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%
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%I suggest using the term "GNU Taler" in the title, once in the
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%abstract, and the first time the name is mentioned in the body text.
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%In the body text, it can have a footnote with more information
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%including a reference to http://gnu.org/gnu/the-gnu-project.html.
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%
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%At the top of page 3, where it says "a free software implementation",
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%it should add "(free as in freedom)", with a reference to
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%http://gnu.org/philosophy/free-sw.html and
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%http://gnu.org/philosophy/free-software-even-more-important.html.
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%
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%Would you please include these things in every article or posting?
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%
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% CG adds:
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% We SHOULD do this for the FINAL paper, not for the anon submission.
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\documentclass{llncs}
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%\usepackage[margin=1in,a4paper]{geometry}
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\usepackage[T1]{fontenc}
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\usepackage{palatino}
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\usepackage{xspace}
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\usepackage{microtype}
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\usepackage{amsmath,amssymb,eurosym}
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\usepackage[dvipsnames]{xcolor}
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\usepackage{tikz}
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\usetikzlibrary{shapes,arrows}
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\usetikzlibrary{positioning}
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\usetikzlibrary{calc}
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% \usepackage{enumitem}
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\usepackage{caption}
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%\usepackage{subcaption}
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\usepackage{subfig}
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% \usepackage{sidecap}
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% \usepackage{wrapfig}
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% Relate to:
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% http://fc14.ifca.ai/papers/fc14_submission_124.pdf
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% Terminology:
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% - SEPA-transfer -- avoid 'SEPA transaction' as we use
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% 'transaction' already when we talk about taxable
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% transfers of Taler coins and database 'transactions'.
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% - wallet = coins at customer
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% - reserve = currency entrusted to exchange waiting for withdrawal
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% - deposit = SEPA to exchange
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% - withdrawal = exchange to customer
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% - spending = customer to merchant
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% - redeeming = merchant to exchange (and then exchange SEPA to merchant)
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% - refreshing = customer-exchange-customer
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% - dirty coin = coin with exposed public key
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% - fresh coin = coin that was refreshed or is new
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% - denomination key = exchange's online key used to (blindly) sign coin
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% - message signing key = exchange's online key to sign exchange messages
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% - exchange master key = exchange's key used to sign other exchange keys
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% - owner = entity that knows coin private key
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% - transaction = coin ownership transfer that should be taxed
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% - sharing = coin copying that should not be taxed
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\title{Refreshing Coins for Giving Change and Refunds \\ in Chaum-style Anonymous Payment Systems}
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\begin{document}
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\mainmatter
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%\author{Florian Dold \and Sree Harsha Totakura \and Benedikt M\"uller \and Jeff Burdges \and Christian Grothoff}
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%\institute{The GNUnet Project}
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\maketitle
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\begin{abstract}
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This paper introduces {\em Taler}, a Chaum-style digital currency that
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enables anonymous payments while ensuring that entities that receive
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payments are auditable. In Taler, customers can
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never defraud anyone, merchants can only fail to deliver the
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merchandise to the customer, and payment service providers can be
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fully audited. All parties receive cryptographic evidence for all
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transactions; still, each party only receives the minimum information
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required to execute transactions. Enforcement of honest behavior is
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timely, and is at least as strict as with legacy credit card payment
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systems that do not provide for privacy.
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The key technical contribution underpinning Taler is a new {\em
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refresh protocol} which allows fractional payments and refunds while
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maintaining untraceability of the customer and unlinkability of
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transactions. The refresh protocol combines an
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efficient cut-and-choose mechanism with a {\em link} step to ensure
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that refreshing is not abused for transactional payments.
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We argue that Taler provides a secure digital currency for modern
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liberal societies as it is a flexible, libre and efficient protocol
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and adequately balances the state's need for monetary control with the
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citizen's needs for private economic activity.
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\end{abstract}
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\section{Introduction}
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The design of payment systems shapes economies and societies. Strong,
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developed nation states have adopted highly transparent payment systems,
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such as the MasterCard and VisaCard credit card schemes and computerized
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bank transactions such as SWIFT. These systems enable mass surveillance
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by both governments and private companies. Aspects of this surveillance
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sometimes benefit society by providing information about tax evasion or
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crimes like extortion. % TODO : anti-money laundering later?
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In particular, bribery and corruption are limited to elites who can
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afford to escape the dragnet.
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%
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At the other extreme, weaker developing nation states have economic
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activity based largely on coins, paper money or even barter. Here,
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the state is often unable to effectively monitor or tax economic
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activity, and this limits the ability of the state to shape the
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society. As bribery is virtually impossible to detect, corruption is
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widespread and not limited to social elites.
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%
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Zerocoin~\cite{miers2013zerocoin} is an example for translating an
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anarchistic economy into the digital realm.
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This paper describes Taler, a simple and practical payment system for
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a social-liberal society, which is underserved by
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current payment systems.
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The Taler protocol is influenced by ideas from
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Chaum~\cite{chaum1983blind} and also follows Chaum's basic
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architecture of customer, merchant and exchange
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(Figure~\ref{fig:cmm}). The two designs share the key first step
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where the {\em customer} withdraws digital {\em coins} from the {\em
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exchange} with unlinkability provided via blind signatures. The
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coins can then be spent at a {\em merchant} who {\em deposits} them at
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the exchange. Taler uses online detection of double-spending and
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provides excuplability via cryptographic proofs. Thus merchants are
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instantly assured that a transaction is valid.
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\begin{figure}[h]
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\centering
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\begin{tikzpicture}
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\tikzstyle{def} = [node distance= 1em and 11em, inner sep=1em, outer sep=.3em];
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\node (origin) at (0,0) {};
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\node (exchange) [def,above=of origin,draw]{Exchange};
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\node (customer) [def, draw, below left=of origin] {Customer};
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\node (merchant) [def, draw, below right=of origin] {Merchant};
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\node (auditor) [def, draw, above right=of origin]{Auditor};
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\tikzstyle{C} = [color=black, line width=1pt]
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\draw [<-, C] (customer) -- (exchange) node [midway, above, sloped] (TextNode) {withdraw coins};
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\draw [<-, C] (exchange) -- (merchant) node [midway, above, sloped] (TextNode) {deposit coins};
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\draw [<-, C] (merchant) -- (customer) node [midway, above, sloped] (TextNode) {spend coins};
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\draw [<-, C] (exchange) -- (auditor) node [midway, above, sloped] (TextNode) {verify};
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\end{tikzpicture}
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\caption{Taler's system model for the payment system is based on Chaum~\cite{chaum1983blind}.}
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\label{fig:cmm}
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\end{figure}
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A key issue for an efficient Chaumian digital payment system is the
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need to provide change. For example, a customer may want to pay
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\EUR{49,99}, but has withdrawn a \EUR{100,00} coin. Withdrawing 10,000
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coins with a denomination of \EUR{0,01} and transferring 4,999 coins would
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be too inefficient. The customer should not
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withdraw exact change from her account, as doing so reduces anonymity
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due to the obvious correlation. A practical payment system must thus
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support giving change.
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Taler solves the problem of giving change by introducing a new
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{\em refresh protocol}. Using this protocol, a customer can obtain
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change or refunds in the form of fresh coins that other parties cannot
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link to the original transaction, the original coin, or each other.
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Additionally, the refresh protocol ensures that the change is owned by
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the same entity which owned the original coin.
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\section{Related Work}
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\subsection{Blockchain-based currencies}
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In recent years, a class of decentralized electronic payment systems,
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based on collectively recorded and verified append-only public
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ledgers, have gained immense popularity. The most well-known protocol
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in this class is Bitcoin~\cite{nakamoto2008bitcoin}. An initial
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concern with Bitcoin was the lack of anonymity, as all Bitcoin
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transactions are recorded for eternity, which can enable
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identification of users. In theory, this concern has been addressed
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with the Zerocoin extension to the protocol~\cite{miers2013zerocoin}.
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The key contribution of blockchain-based protocols is that
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they dispense with the need for a central, trusted
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authority.
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Yet, there are several major irredeemable problems inherent in their designs:
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\begin{itemize}
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\item The computational puzzles solved by Bitcoin nodes with the purpose
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of securing the blockchain consume a considerable amount of energy.
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So Bitcoin is an environmentally irresponsible design.
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\item Bitcoin transactions have pseduononymous recipients, making taxation
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hard to systematically enforce.
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The Zerocoin extension makes this worse.
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\item Bitcoin introduces a new currency, creating additional
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financial risks from currency fluctuation.
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\item Anyone can start an alternative Bitcoin transaction chain,
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called an AltCoin, and, if successful, reap the benefits of the low
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cost to initially create coins cheaply as the proof-of-work
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difficulty adjusts to the computation power of all
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miners in the network. As participants are
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de facto investors, AltCoins become a form of ponzi scheme.
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% As a result, dozens of
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% AltCoins have been created, often without any significant changes to the
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% technology. A large number of AltCoins creates additional overheads for
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% currency exchange and exacerbates the problems with currency fluctuations.
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\end{itemize}
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Anonymity extensions for BitCoin such as Zerocoin~\cite{miers2013zerocoin}
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and BOLT~\cite{BOLT} are also limited to transactions with coins
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of fixed discrete value, creating problems with giving change we
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outlined in the introduction. Furthermore, these extensions have
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problems with aborted transactions, which can reduce the anonymity
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set. Taler's refresh protocol also addresses the problem of aborted
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transactions, ensuring that aborts cannot be used to attack the
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privacy assurances of the system.
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%GreenCoinX\footnote{\url{https://www.greencoinx.com/}} is a more
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%recent AltCoin where the company promises to identify the owner of
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%each coin via e-mail addresses and phone numbers. While it is unclear
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%from their technical description how this identification would be
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%enforced against a determined adversary, the resulting payment system
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%would also merely impose a financial panopticon on a BitCoin-style
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%money supply and transaction model.
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\subsection{Chaum-style electronic cash}
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Chaum~\cite{chaum1983blind} proposed a digital payment system that
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would provide some customer anonymity while disclosing the identity of
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the merchants. DigiCash, a commercial implementation of Chaum's
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proposal, had some limitations and ultimately failed to be widely
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adopted. In our assessment, key reasons for DigiCash's failure
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include:
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\begin{itemize}
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\item The use of patents to protect the technology; a payment system
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should be free software (libre) to have a chance for widespread adoption.
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\item Support for payments to off-line merchants, and thus deferred
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detection of double-spending, requires the exchange to attempt to
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recover funds from delinquent customers via the legal system.
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Any system that fails to be self-enforcing creates a major
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business risk for the exchange and merchants.
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% In 1983, there were merchants without network connectivity, making that
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% feature relevant, but today network connectivity is feasible for most
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% merchants, and saves both the exchange and merchants the business risks
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% associated with deferred fraud detection.
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\item % In addition to the risk of legal disputes with fraudulent
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% merchants and customers,
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Chaum's published design does not clearly
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limit the financial damage a exchange might suffer from the
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disclosure of its private online signing key.
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\item Chaum did not support fractional payments or refunds without
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weakening customer anonymity.
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%, and Brand's
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% extensions for fractional payments broke unlinkability and thus
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% limited anonymity.
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% \item Chaum's system was implemented at a time where the US market
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% was still dominated by paper checks and the European market was
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% fragmented into dozens of currencies. Today, SEPA provides a
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% unified currency and currency transfer method for most of Europe,
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% significantly lowering the barrier to entry into this domain for
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% a larger market.
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\end{itemize}
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Chaum's original digital cash system~\cite{chaum1983blind} was
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extended by Brands~\cite{brands1993efficient} with the ability to {\em
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divide} coins and thus spend certain fractions of a coin using
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restrictive blind signatures. Restrictive blind signatures create
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privacy risks: if a transaction is interrupted, then any coins sent to
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the merchant become tainted, but may never arrive or be spent. It
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becomes tricky to extract the value of the tainted coins without
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linking to the aborted transaction and risking deanonymization.
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Ian Goldberg's HINDE system allowed the merchant to provide change,
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but the mechanism could be abused to hide income from
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taxation.\footnote{Description based on personal communication. HINDE
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was never published.} $k$-show
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signatures~\cite{brands1993efficient} were proposed to achieve
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divisibility for coins. However, with $k$-show signatures multiple
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transactions can be linked to each other. Performing fractional
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payments using $k$-show signatures is also rather expensive.
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%
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%Some argue that the focus on technically perfect but overwhelmingly
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%complex protocols, as well as the the lack of usable, practical
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%solutions lead to an abandonment of these ideas by
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%practitioners~\cite{selby2004analyzing}.
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%
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% FIXME: ask OpenCoin dev's about this! Then make statement firmer!
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To our knowledge, the only publicly available effort to implement
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Chaum's idea is Opencoin~\cite{dent2008extensions}. However, Opencoin
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is neither actively developed nor used, and it is not clear
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to what degree the implementation is even complete. Only a partial
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description of the Opencoin protocol is available to date.
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%\subsection{Peppercoin}
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%Peppercoin~\cite{rivest2004peppercoin} is a microdonation protocol.
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%The main idea of the protocol is to reduce transaction costs by
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%minimizing the number of transactions that are processed directly by
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%the exchange. Instead of always paying, the customer ``gambles'' with the
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%merchant for each microdonation. Only if the merchant wins, the
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%microdonation is upgraded to a macropayment to be deposited at the
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%exchange. Peppercoin does not provide customer-anonymity. The proposed
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%statistical method by which exchanges detect fraudulent cooperation between
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%customers and merchants at the expense of the exchange not only creates
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%legal risks for the exchange, but would also require that the exchange learns
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%about microdonations where the merchant did not get upgraded to a
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%macropayment. It is therefore unclear how Peppercoin would actually
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%reduce the computational burden on the exchange.
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\section{Design}
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The Taler system comprises three principal types of actors
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(Figure~\ref{fig:cmm}): The \emph{customer} is interested in receiving
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goods or services from the \emph{merchant} in exchange for payment.
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To pay, the customer {\em spends} digital coins at the merchant. When
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making a transaction, both the customer and the merchant use the same
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\emph{exchange}, which serves as a payment service provider for the
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financial transaction between the two. The exchange is responsible
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for allowing the customer to withdraw anonymous digital coins from the
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customer's financial reserves, and for enabling the merchant to
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deposit digital coins in return for receiving credit at the merchant's
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financial reserve. In addition, Taler includes an \emph{auditor} who
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assures customers and merchants that the exchange operates correctly.
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\subsection{Security model}
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Taler's security model assumes that cryptographic primitives are
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secure and that each participant is under full control of his system.
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% FIXME: Jeff, can you concisely state the precise assumpitons?
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% (i.e. hardness of EC-DLOG for refresh, RSA assumption, hash collision resistance (?))
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The contact information of the exchange is known to both customer and
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merchant from the start. We further assume that the customer can
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authenticate the merchant, e.g. using X.509
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certificates~\cite{rfc5280}. Finally, we assume that customer has an
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anonymous bi-directional channel, such as Tor, to communicate with
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both the exchange and the merchant.
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The exchange is trusted to hold funds of its customers and to forward
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them when receiving the respective deposit instructions from the
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merchants. Customer and merchant can have assurances about the
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exchange's liquidity and operation though published audits by
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financial regulators or other trusted third parties.
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Online signing keys expire regularly, allowing the exchange to
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eventually destroy the corresponding accumulated cryptographic proofs.
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The merchant is trusted to deliver the service or goods to the
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customer upon receiving payment. The customer can seek legal relief
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to achieve this, as he receives cryptographic proofs of the contract
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and has proof that he paid his obligations.
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Neither the merchant nor the customer have any ability to {\em effectively}
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defraud the exchange or the state collecting taxes. Here, ``effectively''
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means that the expected return for fraud is negative.
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%
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%Note that customers do not need to be trusted in any way, and that in
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%particular it is never necessary for anyone to try to recover funds
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%from customers using legal coersion.
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\subsection{Taxability and Entities}
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Taler ensures that the state can tax {\em transactions}. We must,
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howerver, clarify what constitutes a transaction that can be taxed.
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For ethical and practical reasons, we assume that coins can freely be
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copied between machines, and that coin deletion cannot be verified.
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Avoiding these assumptions would require extreme measures, like custom
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hardware supplied by the exchange. Also, it would be inappropriate to
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tax the moving of funds between two computers owned by the same
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entity. Finally, we assume that at the time digital coins are
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withdrawn, the wallet receiving the coins is owned by the individual
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who is performing the authentication to authorize the withdrawal.
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Preventing the owner of the reserve from deliberately authorizing
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someone else to withdraw electronic coins would require extreme
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measures, including preventing them from communicating with anyone but
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the exchange terminal during withdrawal. As such measures would be
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totally impractical for a minor loophole, we are not concerned with
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enabling the state to strongly identify the recipient of coins
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from a withdrawal operation.
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We view ownership of a coin's private key as a ``capability'' to spend
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the funds. A taxable transaction occurs when a merchant entity gains
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control over the funds while at the same time a customer entity looses
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control over the funds in a manner verifiable to the merchant. In
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other words, we restrict the definition of taxable transactions to
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those transfers of funds where the recipient merchant is distrustful
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of the spending customer, and requires verification that the customer
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lost the capability to spend the funds.
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Conversely, if a coin's private key is shared between two entities,
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then both entities have equal access to the credentials represented by
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the private key. In a payment system, this means that either entity
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could spend the associated funds. Assuming the payment system has
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effective double-spending detection, this means that either entity has
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to constantly fear that the funds might no longer be available to it.
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It follows that sharing coins by copying a private key implies mutual
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trust between the two parties.
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In Taler, making funds available by copying a private key and thus
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sharing control is {\bf not} considered a {\em transaction} and thus
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{\bf not} recorded for taxation. Taler does, however, ensure
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taxability when a merchant entity acquires exclusive control over the
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value represented by a digital coins. For such transactions, the state
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can obtain information from the exchange that identifies
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the entity that received the digital coins as well as the exact value
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of those coins. Taler also allows the exchange, and hence the state,
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to learn the value of digital coins withdrawn by a customer---but not
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how, where, or when they were spent.
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\subsection{Anonymity}
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We assume that an anonymous communication channel
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such as Tor~\cite{tor-design} is
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used for all communication between the customer and the merchant,
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as well as for refreshing tainted coins with the exchange and for
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retrieving the exchange's denomination key.
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Ideally, the customer's anonymity is limited only by this channel;
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however, the payment system does additionally reveal that the customer
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is one of the patrons of the exchange.
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There are naturally risks that the customer-merchant business operation
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may leak identifying information about the customer.
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We consider information leakage specific to the business logic to be
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outside of the scope of the design of Taler.
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Aside from refreshing and obtaining denomination key, the customer
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should ideally use an anonymous communication channel with the exchange
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to obscure their IP address for location privacy, but naturally
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the exchange would typically learn the customer's identity from the wire
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transfer that funds the customer's withdrawal of anonymous digital coins.
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We believe this may even be desirable as there are laws, or bank policies,
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that limit the amount of cash that an individual customer can withdraw
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in a given time period~\cite{france2015cash,greece2015cash}.
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Taler is thus only anonymous with respect to {\em payments}.
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In particular, the exchange
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is unable to link the known identity of the customer that withdrew
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anonymous digital coins to the {\em purchase} performed later at the
|
|
merchant.
|
|
|
|
While the customer thus has untraceability for purchases, the exchange will
|
|
always learn the merchant's identity in order to credit the merchant's
|
|
account. This is also necessary for taxation, as Taler deliberately
|
|
exposes these events as anchors for tax audits on income.
|
|
|
|
% Technically, the merchant could still
|
|
%use an anonymous communication channel to communicate with the exchange.
|
|
%However, in order to receive the traditional currency the exchange will
|
|
%require (SEPA) account details for the deposit.
|
|
|
|
%As both the initial transaction between the customer and the exchange as
|
|
%well as the transactions between the merchant and the exchange do not have
|
|
%to be done anonymously, there might be a formal business contract
|
|
%between the customer and the exchange and the merchant and the exchange. Such
|
|
%a contract may provide customers and merchants some assurance that
|
|
%they will actually receive the traditional currency from the exchange
|
|
%given cryptographic proof about the validity of the transaction(s).
|
|
%However, given the business overheads for establishing such contracts
|
|
%and the natural goal for the exchange to establish a reputation and to
|
|
%minimize cost, it is more likely that the exchange will advertise its
|
|
%external auditors and proven reserves and thereby try to convince
|
|
%customers and merchants to trust it without a formal contract.
|
|
|
|
|
|
\subsection{Coins}
|
|
|
|
A \emph{coin} in Taler is a public-private key pair where the private
|
|
key is only known to the owner of the coin. A coin derives its
|
|
financial value from an RSA signature over a the full domain hash
|
|
(FDH) of the coin's public key. An FDH is used so that ``one-more
|
|
forgery'' is provably hard assuming the RSA known-target inversion
|
|
problem is hard~\cite[Theorem 12]{RSA-HDF-KTIvCTI}. The exchange has
|
|
multiple RSA {\em denomination key} pairs available for blind-signing
|
|
coins of different value.
|
|
|
|
Denomination keys have an expiration date, before which any coins
|
|
signed with it must be spent or refreshed. This allows the exchange
|
|
to eventually discard records of old transactions, thus limiting the
|
|
records that the exchange must retain and search to detect
|
|
double-spending attempts. If a private denomination key were to be
|
|
compromised, the exchange can detect this once more coins are redeemed
|
|
than the total that was signed into existence using that denomination
|
|
key. In this case, the exchange can allow authentic customers to
|
|
redeem their unspent coins that were signed with the compromised
|
|
private key, while refusing further deposits involving coins signed by
|
|
the compromised denomination key. As a result, the financial damage
|
|
of losing a private signing key is limited to at most the amount
|
|
originally signed with that key, and denomination key rotation can be
|
|
used to bound that risk.
|
|
|
|
We ensure that the exchange cannot deanonymize users by signing
|
|
each coin with a fresh denomination key. For this, exchanges are
|
|
required to publicly announce their denomination keys in advance
|
|
with validity periods that imply sufficiently strong anonymity sets.
|
|
These announcements are expected to be signed with an off-line
|
|
long-term private {\em master signing key} of the exchange and the
|
|
auditor. Additionally, customers should obtain these announcements
|
|
using an anonymous communication channel.
|
|
|
|
Before a customer can withdraw a coin from the exchange, he has to pay
|
|
the exchange the value of the coin, as well as processing fees. This
|
|
is done using other means of payment, such as wire transfers or by
|
|
having a financial {\em reserve} at the exchange. Taler assumes that
|
|
the customer has a {\em withdrawal authorization key} to identify
|
|
himself as authorized to withdraw funds from the reserve. By signing
|
|
the withdrawal request using this withdrawal authorization key, the
|
|
customer can prove to the exchange that he is authorized to withdraw
|
|
anonymous digital coins from his reserve. The exchange records the
|
|
withdrawal message as proof that the reserve was debited correctly.
|
|
|
|
%To put it differently, unlike
|
|
%modern cryptocurrencies like BitCoin, Taler's design simply
|
|
%acknowledges that primitive accumulation~\cite{engels1844} predates
|
|
%the system and that a secure method to authenticate owners exists.
|
|
|
|
After a coin is issued, the customer is the only entity that knows the
|
|
private key of the coin, making him the \emph{owner} of the coin. Due
|
|
to the use of blind signatures, the exchange does not even learn the
|
|
public key during the withdrawal process. If the private key is
|
|
shared with others, they become co-owners of the coin. Knowledge of
|
|
the private key of the coin and the signature over the coin's public
|
|
key by an exchange's denomination key enables the owner to spent the
|
|
coin.
|
|
|
|
|
|
% \subsection{Coin spending}
|
|
|
|
A customer spends a coin at a merchant by cryptographically signing a
|
|
{\em deposit authorization} with the coin's private key. A deposit
|
|
authorization specifies the fraction of the coin's value to be paid to
|
|
the merchant, the salted hash of a merchant's financial reserve
|
|
routing information and a {\em business transaction-specific hash}.
|
|
Taler exchanges ensure that all transactions involving the same coin
|
|
do not exceed the total value of the coin simply by requiring that
|
|
merchants clear transactions immediately with the exchange.
|
|
|
|
If the customer is cheating and the coin was already spent, the
|
|
exchange provides the previous deposit authorization as cryptographic
|
|
proof of the fraud to the merchant. If the deposit authorization is
|
|
correct, the exchange transfers the funds to the merchant by crediting
|
|
the merchant's financial reserve, e.g. using a wire transfer.
|
|
|
|
|
|
\subsection{Refreshing Coins}
|
|
|
|
If only a fraction of a coin's value has been spent, or if a
|
|
transaction fails for other reasons, it is possible that a customer
|
|
has revealed the public key of a coin to a merchant, but not
|
|
ultimately spent the full value of the coin. If the customer then
|
|
continues to directly use the coin in other transactions, merchants
|
|
and the exchange could link the various transactions as they all share
|
|
the same public key for the coin. We call a coin {\em dirty} if its
|
|
public key is known to anyone but the owner.
|
|
|
|
To avoid linkability of transactions, Taler allows the owner of a
|
|
dirty coin to exchange it for a {\em fresh} coin using the {\em coin
|
|
refreshing protocol}. Even if a coin is not dirty, the owner of a
|
|
coin may want to exchange it if the respective denomination key is
|
|
about to expire. The {\em coin refreshing protocol}, allows the owner
|
|
of a coin to {\em melt} it for fresh coins of the same total value with a
|
|
new public-private key pairs. Refreshing does not use the ordinary
|
|
spending operation as the owner of a coin should not have to pay
|
|
(income) taxes for refreshing. However, to ensure that refreshing is
|
|
not used for money laundering or tax evasion, the refreshing protocol
|
|
assures that the owner stays the same.
|
|
|
|
The refresh protocol has two key properties: First, the exchange is
|
|
unable to link the fresh coin's public key to the public key of the
|
|
dirty coin. Second, it is assured that the owner of the dirty coin
|
|
can determine the private key of the fresh coin, thereby preventing
|
|
the refresh protocol from being used to transfer ownership.
|
|
|
|
|
|
\section{Taler's Cryptographic Protocols}
|
|
|
|
\def\KDF{\textrm{KDF}}
|
|
\def\FDH{\textrm{FDH}}
|
|
|
|
% In this section, we describe the protocols for Taler in detail.
|
|
|
|
For the sake of brevity we omit explicitly saying each time that a
|
|
recipient of a signed message always first checks that the signature
|
|
is valid. Furthermore, the receiver of a signed message is either
|
|
told the respective public key, or knows it from the context. Also,
|
|
all signatures contain additional identification as to the purpose of
|
|
the signature, making it impossible to use a signature in a different
|
|
context.
|
|
|
|
An exchange has a long-term offline key which is used to certify
|
|
denomination keys and {\em online message signing keys} of the
|
|
exchange. {\em Online message signing keys} are used for signing
|
|
protocol messages; denomination keys are used for blind-signing coins.
|
|
The exchange's long-term offline key is assumed to be known to both
|
|
customers and merchants and is certified by the auditors.
|
|
|
|
We avoid asking either customers or merchants to make trust desissions
|
|
about individual exchanges. Instead, they need only select the auditors.
|
|
Auditors must sign all the exchange's keys including, the individual
|
|
denomination keys.
|
|
|
|
As we are dealing with financial transactions, we explicitly describe
|
|
whenever entities need to safely commit data to persistent storage.
|
|
As long as those commitments persist, the protocol can be safely
|
|
resumed at any step. Commitments to disk are cumulative, that is an
|
|
additional commitment does not erase the previously committed
|
|
information. Keys and thus coins always have a well-known expiration
|
|
date; information committed to disk can be discarded after the
|
|
expiration date of the respective public key.
|
|
Customers may discard information once the respective coins have been
|
|
fully spent, so long as refunds are not required.
|
|
Merchants may discard information once payments from the exchange have
|
|
been received, assuming the records are also no longer needed for tax
|
|
purposes. The exchange's bank transfers dealing in traditional currency
|
|
are expected to be recorded for tax authorities to ensure taxability.
|
|
% FIXME: Auditor?
|
|
|
|
$S_K$ denotes RSA signing with denomination key $K$ and EdDSA
|
|
over eliptic curve $\mathbb{E}$ for other types of keys.
|
|
$G$ denotes the generator of elliptic curve $\mathbb{E}$.
|
|
|
|
\subsection{Withdrawal}
|
|
|
|
To withdraw anonymous digital coins, the customer first selects an
|
|
exchange and one of its public denomination public keys $K_p$ whose
|
|
value $K_v$ corresponds to an amount the customer wishes to withdraw.
|
|
We let $K_s$ denote the exchange's private key corresponding to $K_p$.
|
|
Now the customer carries out the following interaction with the exchange:
|
|
|
|
% FIXME: We say withdrawal key in this document, but say reserve key in
|
|
% others, so probably withdrawal key should be renamed to reserve key.
|
|
|
|
% FIXME: These steps occur at very different points in time, so probably
|
|
% they should be restructured into more of a protocol discription.
|
|
% It does create some confusion, like is a withdrawal key semi-ephemeral
|
|
% like a linking key?
|
|
|
|
\begin{description}
|
|
\item[Setup] The customer randomly generates:
|
|
\begin{itemize}
|
|
\item withdrawal key $W := (w_s,W_p)$ with private key $w_s$ and public key $W_p$,
|
|
\item coin key $C := (c_s,C_p)$ with private key $c_s$ and public key $C_p := c_s G$,
|
|
\item blinding factor $b$, and commits $\langle W, C, b \rangle$ to disk.
|
|
\end{itemize}
|
|
\item[Wire transfer send]
|
|
The customer transfers an amount of money corresponding to
|
|
at least $K_v$ to the exchange, with $W_p$ in the subject line
|
|
of the transaction.
|
|
\item[Wire transfer recieve]
|
|
The exchange receives the transaction and credits the reserve $W_p$
|
|
with the respective amount in its database.
|
|
\item[POST {\tt /withdraw/sign}]
|
|
The customer sends $S_W(B)$ where $B := B_b(\FDH_K(C_p))$ to
|
|
the exchange to request withdrawal of $C$; here, $B_b$ denotes
|
|
Chaum-style blinding with blinding factor $b$.
|
|
\item[200 OK / 403 FORBIDDEN]
|
|
The exchange checks if the same withdrawal request was issued before;
|
|
in this case, it sends a Chaum-style blind signature $S_K(B)$ with
|
|
private key $K_s$ to the customer. \\
|
|
If this is a fresh withdrawal request, the exchange performs the following transaction:
|
|
\begin{enumerate}
|
|
\item checks if the reserve $W_p$ has sufficient funds
|
|
for a coin of value corresponding to $K$,
|
|
\item stores the withdrawal request and response
|
|
$\langle S_W(B), S_K(B) \rangle$ in its database
|
|
for future reference,
|
|
\item deducts the amount corresponding to $K$ from the reserve,
|
|
\end{enumerate}
|
|
and then sends $S_K(B)$ to the customer.
|
|
If the guards for the transaction fail, the exchange sends a descriptive
|
|
error back to the customer, with proof that it operated correctly.
|
|
Assuming the signature was valid, this would involve showing the transaction
|
|
history for the reserve.
|
|
\item[Done] The customer computes and verifies the unblinded signature
|
|
$S_K(\FDH_K(C_p)) = U_b(S_K(B))$.
|
|
Finally the customer saves the coin $\langle S_K(\FDH_K(C_p)), c_s \rangle$
|
|
to their local wallet on disk.
|
|
\end{description}
|
|
|
|
|
|
\subsection{Exact and partial spending}
|
|
|
|
A customer can spend coins at a merchant, under the condition that the
|
|
merchant trusts the exchange that issued the coin.
|
|
% FIXME: Auditor here?
|
|
Merchants are identified by their public key $M_p$ which the
|
|
customer's wallet learns through the merchant's webpage, which itself
|
|
should be authenticated with X.509c.
|
|
% FIXME: Is this correct?
|
|
|
|
We now describe the protocol between the customer, merchant, and exchange
|
|
for a transaction in which the customer spends a coin $C := (c_s, C_p)$
|
|
with signature $\widetilde{C} := S_K(\FDH_K(C_p))$
|
|
where $K$ is the exchange's demonination key.
|
|
|
|
% FIXME: Again, these steps occur at different points in time, maybe
|
|
% that's okay, but refresh is slightly different.
|
|
|
|
\begin{description}
|
|
\item[Merchant Setup] % \label{contract}
|
|
Let $\vec{X} := \langle X_1, \ldots, X_n \rangle$ denote the list of
|
|
exchanges accepted by the merchant where each $X_j$ is a exchange's
|
|
public key.
|
|
\item[Proposal]
|
|
The merchant creates a digitally signed contract
|
|
$\mathcal{A} := S_M(m, f, a, H(p, r), \vec{X})$
|
|
where $m$ is an identifier for this transaction, $f$ is the price of the offer,
|
|
and $a$ is data relevant
|
|
to the contract indicating which services or goods the merchant will
|
|
deliver to the customer, including the {\tt /merchant-specific} URI for the payment.
|
|
$p$ is the merchant's payment information (e.g. his IBAN number), and
|
|
$r$ is a random nonce. The merchant commits $\langle \mathcal{A} \rangle$
|
|
to disk and sends $\mathcal{A}$ to the customer.
|
|
\item[Customer Setup]
|
|
The customer should already possess a coin $\widetilde{C}$ issued by a exchange that is
|
|
accepted by the merchant, meaning $K$ of $\widetilde{C}$ should be publicly signed by
|
|
some $X_j$ from $\vec{X}$, and has a value $\geq f$.
|
|
\item[POST {\tt /merchant-specific}]
|
|
Let $X_j$ be the exchange which signed $\widetilde{C}$ with $K$.
|
|
The customer generates a \emph{deposit-permission}
|
|
$\mathcal{D} := S_c(\widetilde{C}, m, f, H(a), H(p,r), M_p)$
|
|
and sends $\langle \mathcal{D}, X_j\rangle$ to the merchant.
|
|
\item[POST {\tt/deposit}]
|
|
The merchant gives $(\mathcal{D}, p, r)$ to the exchange, thereby
|
|
revealing $p$ only to the exchange.
|
|
\item[200 OK / 403 FORBIDDEN]
|
|
The exchange validates $\mathcal{D}$ and checks for double spending.
|
|
If the coin has been involved in previous transactions and the new
|
|
one would exceed its remaining value, it sends a ``403 FORBIDDEN'' error
|
|
with the records from the previous transactions back to the merchant. \\
|
|
%
|
|
If double spending is not found, the exchange commits $\langle \mathcal{D} \rangle$ to disk
|
|
and signs a ``200 OK'' message affirming the deposit operation was successful.
|
|
\item[200 OK / 424 FAILED DEPENDENCY]
|
|
The merchant commits and forwards the notification from the exchange to the
|
|
customer, confirming the success (``200 OK'') or failure (``424 FAILED DEPENDENCY'')
|
|
of the operation.
|
|
\end{description}
|
|
|
|
We have simplified the exposition by assuming that one coin suffices,
|
|
but in practice a customer can use multiple coins from the same
|
|
exchange where the total value adds up to $f$ by running the above
|
|
steps for each of the coins.
|
|
|
|
If a transaction is aborted after the first POST, subsequent
|
|
transactions with the same coin could be linked to this operation.
|
|
The same applies to partially spent coins where $f$ is smaller than
|
|
the actual value of the coin. To unlink subsequent transactions from
|
|
a coin, the customer has to execute the following coin refreshing
|
|
protocol with the exchange.
|
|
|
|
%\begin{figure}[h]
|
|
%\centering
|
|
%\begin{tikzpicture}
|
|
%
|
|
%\tikzstyle{def} = [node distance= 1em, inner sep=.5em, outer sep=.3em];
|
|
%\node (origin) at (0,0) {};
|
|
%\node (offer) [def,below=of origin]{make offer (merchant $\rightarrow$ customer)};
|
|
%\node (A) [def,below=of offer]{permit lock (customer $\rightarrow$ merchant)};
|
|
%\node (B) [def,below=of A]{apply lock (merchant $\rightarrow$ exchange)};
|
|
%\node (C) [def,below=of B]{confirm (or refuse) lock (exchange $\rightarrow$ merchant)};
|
|
%\node (D) [def,below=of C]{sign contract (merchant $\rightarrow$ customer)};
|
|
%\node (E) [def,below=of D]{permit deposit (customer $\rightarrow$ merchant)};
|
|
%\node (F) [def,below=of E]{make deposit (merchant $\rightarrow$ exchange)};
|
|
%\node (G) [def,below=of F]{transfer confirmation (exchange $\rightarrow$ merchant)};
|
|
%
|
|
%\tikzstyle{C} = [color=black, line width=1pt]
|
|
%\draw [->,C](offer) -- (A);
|
|
%\draw [->,C](A) -- (B);
|
|
%\draw [->,C](B) -- (C);
|
|
%\draw [->,C](C) -- (D);
|
|
%\draw [->,C](D) -- (E);
|
|
%\draw [->,C](E) -- (F);
|
|
%\draw [->,C](F) -- (G);
|
|
%
|
|
%\draw [->,C, bend right, shorten <=2mm] (E.east)
|
|
% to[out=-135,in=-45,distance=3.8cm] node[left] {aggregate} (D.east);
|
|
%\end{tikzpicture}
|
|
%\caption{Interactions between a customer, merchant and exchange in the coin spending
|
|
% protocol}
|
|
%\label{fig:spending_protocol_interactions}
|
|
%\end{figure}
|
|
|
|
|
|
\subsection{Refreshing} \label{sec:refreshing}
|
|
|
|
We now describe the refresh protocol whereby a dirty coin $C'$ of
|
|
denomination $K$ is melted to obtain a fresh coin $\widetilde{C}$
|
|
with the same denomination. In practice, Taler uses a natural
|
|
extension where multiple fresh coins are generated a the same time to
|
|
enable giving precise change matching any amount.
|
|
|
|
In the protocol, $\kappa \ge 2$ is a security parameter for the
|
|
cut-and-choose part of the protocol. $\kappa = 3$ is actually
|
|
perfectly sufficient in most cases in practice, as the cut-and-choose
|
|
protocol does not need to provide cryptographic security: If the
|
|
maximum applicable tax is less than $\frac{2}{3}$, then $\kappa = 3$
|
|
ensures that cheating results in a negative financial return on
|
|
average as $\kappa - 1$ out of $\kappa$ attempts to hide from taxation
|
|
are detected and penalized by a total loss. This makes the use of
|
|
cut-and-choose practical and efficient in this context.
|
|
|
|
% FIXME: I'm explicit about the rounds in postquantum.tex
|
|
|
|
\begin{description}
|
|
\item[POST {\tt /refresh/melt}]
|
|
For each $i = 1,\ldots,\kappa$, the customer randomly generates
|
|
a transfer private key $t^{(i)}_s$ and computes
|
|
\begin{itemize}
|
|
\item the transfer public key $T^{(i)}_p := t^{(i)}_s G$ and
|
|
\item the new coin secret seed $L^{(i)} := H(c'_s T_p^{(i)})$.
|
|
\end{itemize}
|
|
We have computed $L_i$ as a Diffie-Hellman shared secret between
|
|
the transfer key pair $T^{(i)} := \left(t^{(i)}_s,T^{(i)}_p\right)$
|
|
and old coin key pair $C' := \left(c_s', C_p'\right)$;
|
|
as a result, $L^{(i)} = H(t^{(i)}_s C'_p)$ also holds.
|
|
Now the customer applies key derivation functions $\KDF_{\textrm{blinding}}$ and $\KDF_{\textrm{Ed25519}}$ to $L^{(i)}$ to generate
|
|
\begin{itemize}
|
|
\item a blinding factor $b^{(i)} = \FDH_K(\KDF_{\textrm{blinding}}(L^{(i)}))$.
|
|
\item $c_s^{(i)} = \KDF_{\textrm{Ed25519}}(L^{(i)})$
|
|
\end{itemize}
|
|
Now the customer can compute her new coin key pair
|
|
$C^{(i)} := \left(c_s^{(i)}, C_p^{(i)}\right)$
|
|
where $C^{(i)}_p := c^{(i)}_s G$.
|
|
|
|
The customer saves to disk $\langle C', \vec{t}\rangle$ where
|
|
$\vec{t} = \langle t^{(1)}_s, \ldots, t^{(\kappa)}_s \rangle$.
|
|
We observe that $t^{(i)}_s$ suffices to regenerate $C^{(i)}$ and $b^{(i)}$
|
|
using the same key derivation functions.
|
|
|
|
% \item
|
|
The customer computes $B^{(i)} := B_{b^{(i)}}(\FDH_K(C^{(i)}_p))$
|
|
for $i \in \{1,\ldots,\kappa\}$ and sends a commitment
|
|
$S_{C'}(\vec{B}, \vec{T_p})$ to the exchange.
|
|
\item[200 OK / 409 CONFLICT]
|
|
The exchange generates a random $\gamma$ with $1 \le \gamma \le \kappa$ and
|
|
marks $C'_p$ as spent by committing
|
|
$\langle C', \gamma, S_{C'}(\vec{B}, \vec{T_p}) \rangle$ to disk.
|
|
Auditing processes should assure that $\gamma$ is unpredictable until
|
|
this time to prevent the exchange from assisting tax evasion. \\
|
|
%
|
|
The exchange sends $S_{K'}(C'_p, \gamma)$ to the customer where
|
|
$K'$ is the exchange's message signing key, thereby commmitting the exchange to $\gamma$.
|
|
\item[POST {\tt /refresh/reveal}]
|
|
The customer commits $\langle C', S_K(C'_p, \gamma) \rangle$ to disk.
|
|
Also, the customer assembles
|
|
$\mathfrak{R} := \left(t_s^{(i)}\right)_{i \ne \gamma}$
|
|
and sends $S_{C'}(\mathfrak{R})$ to the exchange.
|
|
\item[200 OK / 400 BAD REQUEST] % \label{step:refresh-ccheck}
|
|
The exchange checks whether $\mathfrak{R}$ is consistent with
|
|
the commitments; specifically, it computes for $i \not= \gamma$:
|
|
|
|
\vspace{-2ex}
|
|
\begin{minipage}{5cm}
|
|
\begin{align*}
|
|
\overline{L^{(i)}} :&= H(t_s^{(i)} C_p') \\
|
|
\overline{c_s^{(i)}} :&= \KDF_{\textrm{Ed25519}}(\overline{L^{(i)}}) \\
|
|
\overline{C^{(i)}_p} :&= \overline{c_s^{(i)}} G
|
|
\end{align*}
|
|
\end{minipage}
|
|
\begin{minipage}{5cm}
|
|
\begin{align*}
|
|
\overline{T_p^{(i)}} :&= t_s^{(i)} G \\
|
|
\overline{b^{(i)}} :&= \FDH_K(\KDF_{\textrm{blinding}}(\overline{L^{(i)}})) \\
|
|
\overline{B^{(i)}} :&= B_{\overline{b^{(i)}}}(\overline{C_p^{(i)}})
|
|
\end{align*}
|
|
\end{minipage}
|
|
|
|
and checks if $\overline{B^{(i)}} = B^{(i)}$
|
|
and $\overline{T^{(i)}_p} = T^{(i)}_p$.
|
|
|
|
% \item[200 OK / 409 CONFLICT] % \label{step:refresh-done}
|
|
If the commitments were consistent, the exchange sends the
|
|
blind signature $\widetilde{C} := S_{K}(B^{(\gamma)})$ to the customer.
|
|
Otherwise, the exchange responds with an error indicating
|
|
the location of the failure.
|
|
\end{description}
|
|
|
|
%\subsection{N-to-M Refreshing}
|
|
%
|
|
%TODO: Explain, especially subtleties regarding session key / the spoofing attack that requires signature.
|
|
|
|
\subsection{Linking}
|
|
|
|
% FIXME: What is \mathtt{link} ?
|
|
|
|
For a coin that was successfully refreshed, the exchange responds to a
|
|
request $S_{C'}(\mathtt{link})$ with $(T^{(\gamma)}_p, \widetilde{C})$.
|
|
%
|
|
This allows the owner of the melted coin to derive the private key of
|
|
the new coin, even if the refreshing protocol was illicitly executed
|
|
with the help of another party who generated $\vec{c_s}$ and only
|
|
provided $\vec{C_p}$ and other required information to the old owner.
|
|
As a result, linking ensures that access to the new coins issued in
|
|
the refresh protocol is always {\em shared} with the owner of the
|
|
melted coins. This makes it impossible to abuse the refresh protocol
|
|
for {\em transactions}.
|
|
|
|
The linking request is not expected to be used at all during ordinary
|
|
operation of Taler. If the refresh protocol is used by Alice to
|
|
obtain change as designed, she already knows all of the information
|
|
and thus has little reason to request it via the linking protocol.
|
|
The fundamental reason why the exchange must provide the link protocol
|
|
is simply to provide a threat: if Bob were to use the refresh protocol
|
|
for a transaction of funds from Alice to him, Alice may use a link
|
|
request to gain shared access to Bob's coins. Thus, this threat
|
|
prevents Alice and Bob from abusing the refresh protocol to evade
|
|
taxation on transactions. If Bob trusts Alice to not execute the link
|
|
protocol, then they can already conspire to evade taxation by simply
|
|
exchanging the original private coin keys. This is permitted in our
|
|
taxation model as with such trust they are assumed to be the same
|
|
entity.
|
|
|
|
The auditor can anonymously check if the exchange correctly implements the
|
|
link request, thus preventing the exchange operator from secretly disabling
|
|
this protocol component. Without the link operation, Taler would
|
|
devolve into a payment system where both sides can be anonymous, and
|
|
thus no longer provide taxability.
|
|
|
|
|
|
\subsection{Error handling}
|
|
|
|
During operation, there are three main types of errors that are
|
|
expected. First, in the case of faulty clients, the responding server
|
|
will generate an error message with detailed cryptographic proofs
|
|
demonstrating that the client was faulty, for example by providing
|
|
proof of double-spending or providing the previous commit and the
|
|
location of the missmatch in the case of the reveal step in the
|
|
refresh protocol. It is also possible that the server may claim that
|
|
the client has been violating the protocol. In these cases, the
|
|
clients should verify any proofs provided and if they are acceptable,
|
|
notify the user that they are somehow faulty. Similar, if the
|
|
server indicates that the client is violating the protocol, the
|
|
client should record the interaction and enable the user to file a
|
|
bug report.
|
|
|
|
The second case is a faulty exchange service provider. Here, faults
|
|
will be detected when the exchange provides a faulty proof or no
|
|
proof. In this case, the client is expected to notify the auditor,
|
|
providing a transcript of the interaction. The auditor can then
|
|
anonymously replay the transaction, and either provide the now correct
|
|
response to the client or take appropriate legal action against the
|
|
faulty exchange.
|
|
|
|
The third case are transient failures, such as network failures or
|
|
temporary hardware failures at the exchange service provider. Here, the
|
|
client may receive an explicit protocol indication, such as an HTTP
|
|
response code ``500 INTERNAL SERVER ERROR'' or simply no response.
|
|
The appropriate behavior for the client is to automatically retry
|
|
after 1s, and twice more at randomized times within 1 minute.
|
|
If those three attempts fail, the user should be informed about the
|
|
delay. The client should then retry another three times within the
|
|
next 24h, and after that time the auditor should be informed about the outage.
|
|
Using this process, short term failures should be effectively obscured
|
|
from the user, while malicious behavior is reported to the auditor who
|
|
can then presumably rectify the situation, using methods such as
|
|
shutting down the operator and helping customers to regain refunds for
|
|
coins in their wallets. To ensure that such refunds are possible, the
|
|
operator is expected to always provide adequate securities for the
|
|
amount of coins in circulation as part of the certification process.
|
|
|
|
|
|
%As with support for fractional payments, Taler addresses these
|
|
%problems by allowing customers to refresh tainted coins, thereby
|
|
%destroying the link between the refunded or aborted transaction and
|
|
%the new coin.
|
|
|
|
|
|
\subsection{Refunds}
|
|
|
|
The refresh protocol offers an easy way to enable refunds to
|
|
customers, even if they are anonymous. Refunds can be supported
|
|
by including a public signing key of the merchant in the transaction
|
|
details, and having the customer keep the private key of the spent
|
|
coins on file.
|
|
|
|
Given this, the merchant can simply sign a {\em refund confirmation}
|
|
and share it with the exchange and the customer. Assuming the
|
|
exchange has a way to recover the funds from the merchant, or has not
|
|
yet performed the wire transfer, the exchange can simply add the value
|
|
of the refunded transaction back to the original coin, re-enabling
|
|
those funds to be spent again by the original customer. This customer
|
|
can then use the refresh protocol to anonymously melt the refunded
|
|
coin and create a fresh coin that is unlinkable to the refunded
|
|
transaction.
|
|
|
|
\section{Experimental results}
|
|
|
|
%\begin{figure}[b!]
|
|
% \begin{subfigure}{0.45\columnwidth}
|
|
% \includegraphics[width=\columnwidth]{bw_in.png}
|
|
% \caption{Incoming traffic at the exchange, in bytes per 5 minutes.}
|
|
% \label{fig:in}
|
|
% \end{subfigure}\hfill
|
|
% \begin{subfigure}{0.45\columnwidth}
|
|
% \includegraphics[width=\columnwidth]{bw_out.png}
|
|
% \caption{Outgoing traffic from the exchange, in bytes per 5 minutes.}
|
|
% \label{fig:out}
|
|
% \end{subfigure}
|
|
% \begin{subfigure}{0.45\columnwidth}
|
|
% \includegraphics[width=\columnwidth]{db_read.png}
|
|
% \caption{DB read operations per second.}
|
|
% \label{fig:read}
|
|
% \end{subfigure}
|
|
% \begin{subfigure}{0.45\columnwidth}
|
|
% \includegraphics[width=\columnwidth]{db_write.png}
|
|
% \caption{DB write operations per second.}
|
|
% \label{fig:write}
|
|
% \end{subfigure}
|
|
% \begin{subfigure}{0.45\columnwidth}
|
|
% \includegraphics[width=\columnwidth]{cpu_balance.png}
|
|
% \caption{CPU credit balance. Hitting a balance of 0 shows the CPU is
|
|
% the limiting factor.}
|
|
% \label{fig:cpu}
|
|
% \end{subfigure}\hfill
|
|
% \begin{subfigure}{0.45\columnwidth}
|
|
% \includegraphics[width=\columnwidth]{cpu_usage.png}
|
|
% \caption{CPU utilization. The t2.micro instance is allowed to use 10\% of
|
|
% one CPU.}
|
|
% \label{fig:usage}
|
|
% \end{subfigure}
|
|
% \caption{Selected EC2 performance monitors for the experiment in the EC2
|
|
% (after several hours, once the system was ``warm'').}
|
|
% \label{fig:ec2}
|
|
%\end{figure}
|
|
|
|
We ran the Taler exchange v0.0.2 on an Amazon EC2 t2.micro instance
|
|
(10\% of a Xeon E5-2676 at 2.4 GHz) based on Ubuntu 14.04.4 LTS, using
|
|
a db.t2.micro instance with Postgres 9.5 for the database. Using 16
|
|
concurrent clients performing withdraw, deposit and refresh operations
|
|
we then pushed the t2.micro instance to the resource limit
|
|
%(Figure~\ref{fig:cpu})
|
|
from a network with $\approx$ 160 ms latency to
|
|
the EC2 instance. At that point, the instance managed about 8 HTTP
|
|
requests per second, which roughly corresponds to one full business
|
|
transaction (as a full business transaction is expected to involve
|
|
withdrawing and depositing several coins). The network traffic was
|
|
modest at approximately 50 kbit/sec from the exchange
|
|
%(Figure~\ref{fig:out})
|
|
and 160 kbit/sec to the exchange.
|
|
%(Figure~\ref{fig:in}).
|
|
At network latencies above 10 ms, the delay
|
|
for executing a transaction is dominated by the network latency, as
|
|
local processing virtually always takes less than 10 ms.
|
|
|
|
Database transactions are dominated by writes%
|
|
%(Figure~\ref{fig:read} vs. Figure~\ref{fig:write})
|
|
, as Taler mostly needs to log
|
|
transactions and occasionally needs to read to guard against
|
|
double-spending. Given a database capacity of 2 TB---which should
|
|
suffice for more than one year of full transaction logs---the
|
|
described setup has a hosting cost within EC2 of approximately USD 252
|
|
per month, or roughly 0.0001 USD per full business transaction. This
|
|
compares favorably to the $\approx$ USD 10 per business transaction
|
|
for Bitcoin and the \EUR{0.35} plus 1.9\% charged by Paypal for
|
|
domestic transfers within Germany.
|
|
|
|
In the Amazon EC2 billing, the cost for the database (using SSD
|
|
storage) dominates the cost with more than USD 243 per month. We note
|
|
that these numbers are approximate, as the frontend and backend in our
|
|
configuration uses systems from the AWS Free Usage Tier and is not
|
|
perfectly balanced in between frontend and backend. Nevertheless,
|
|
these experimental results show that computing-related business costs
|
|
will only marginally contribute to the operational costs of the Taler
|
|
payment system.
|
|
|
|
|
|
|
|
\section{Discussion}
|
|
|
|
% \subsection{Well-known attacks}
|
|
|
|
Taler's security is largely equivalent to that of Chaum's original
|
|
design without online checks or the cut-and-choose revelation of
|
|
double-spending customers for offline spending.
|
|
We specifically note that the digital equivalent of the ``Columbian
|
|
Black Market Exchange''~\cite{fatf1997} is a theoretical problem for
|
|
both Chaum and Taler, as individuals with a strong mutual trust
|
|
foundation can simply copy electronic coins and thereby establish a
|
|
limited form of black transfers. However, unlike the situation with
|
|
physical checks with blank recipients in the Columbian black market,
|
|
the transitivity is limited as each participant can deposit the electronic
|
|
coins and thereby cheat any other participant, while in the Columbian
|
|
black market each participant only needs to trust the issuer of the
|
|
check and not also all previous owners of the physical check.
|
|
|
|
As with any unconditionally anonymous payment system, the ``Perfect
|
|
Crime'' attack~\cite{solms1992perfect} where blackmail is used to
|
|
force the exchange to issue anonymous coins also continues to apply in
|
|
principle. However, as mentioned Taler does facilitate limits on
|
|
withdrawals, which we believe is a better trade-off than the
|
|
problematic escrow systems where the necessary intransparency
|
|
actually facilitates voluntary cooperation between the exchange and
|
|
criminals~\cite{sander1999escrow} and where the state could
|
|
deanonymize citizens.
|
|
|
|
%\subsection{Offline Payments}
|
|
|
|
Chaum's original proposals for anonymous digital cash avoided the need
|
|
for online interactions with the exchange to detect double spending by
|
|
providing a means to deanonymize customers involved in
|
|
double-spending. This is problematic as the exchange or the merchant
|
|
still need out-of-band means to recover funds from the customer, which
|
|
may be infeasible in practice. Furthermore, a customer may
|
|
accidentally deanonymize himself, for example by double-spending a
|
|
coin after restoring from backup.
|
|
|
|
%\subsection{Merchant Tax Audits}
|
|
%
|
|
%For a tax audit on the merchant, the exchange includes the business
|
|
%transaction-specific hash in the transfer of the traditional
|
|
%currency. A tax auditor can then request the merchant to reveal
|
|
%(meaningful) details about the business transaction ($\mathcal{D}$,
|
|
%$a$, $p$, $r$), including proof that applicable taxes were paid.
|
|
%
|
|
%If a merchant is not able to provide theses values, he can be
|
|
%subjected to financial penalties by the state in relation to the
|
|
%amount transferred by the traditional currency transfer.
|
|
|
|
% \subsection{Cryptographic proof vs. evidence}
|
|
|
|
In this paper we have use the term ``proof'' in many places as the
|
|
protocol provides cryptographic proofs of which parties behave
|
|
correctly or incorrectly. However, as~\cite{fc2014murdoch} point out,
|
|
in practice financial systems need to provide evidence that holds up
|
|
in courts. Taler's implementation is designed to export evidence and
|
|
upholds the core principles described in~\cite{fc2014murdoch}. In
|
|
particular, in providing the cryptographic proofs as evidence none of
|
|
the participants have to disclose their core secrets.
|
|
|
|
|
|
%\subsection{System Performance}
|
|
%
|
|
%We performed some initial performance measurements for the various
|
|
%operations on our exchange implementation. The main conclusion was that
|
|
%the computational and bandwidth cost for transactions described in
|
|
%this paper is smaller than $10^{-3}$ cent/transaction, and thus
|
|
%dwarfed by the other business costs for the exchange. However, this
|
|
%figure excludes the cost of currency transfers using traditional
|
|
%banking, which a exchange operator would ultimately have to interact with.
|
|
%Here, exchange operators should be able to reduce their expenses by
|
|
%aggregating multiple transfers to the same merchant.
|
|
|
|
|
|
%\section{Conclusion}
|
|
|
|
%We have presented an efficient electronic payment system that
|
|
%simultaneously addresses the conflicting objectives created by the
|
|
%citizen's need for privacy and the state's need for taxation. The
|
|
%coin refreshing protocol makes the design flexible and enables a
|
|
%variety of payment methods. The current balance and profits of the
|
|
%exchange are also easily determined, thus audits can be used to ensure
|
|
%that the exchange operates correctly. The libre implementation and open
|
|
%protocol may finally enable modern society to upgrade to proper
|
|
%electronic wallets with efficient, secure and privacy-preserving
|
|
%transactions.
|
|
|
|
% commented out for anonymized submission
|
|
%\subsection*{Acknowledgements}
|
|
|
|
%This work was supported by a grant from the Renewable Freedom Foundation.
|
|
% FIXME: ARED?
|
|
%We thank Tanja Lange, Dan Bernstein, Luis Ressel and Fabian Kirsch for feedback on an earlier
|
|
%version of this paper, Nicolas Fournier for implementing and running
|
|
%some performance benchmarks, and Richard Stallman, Hellekin Wolf,
|
|
%Jacob Appelbaum for productive discussions and support.
|
|
|
|
|
|
\bibliographystyle{alpha}
|
|
\bibliography{taler,rfc}
|
|
|
|
%\vfill
|
|
%\begin{center}
|
|
% \Large Demonstration available at \url{https://demo.taler.net/}
|
|
%\end{center}
|
|
%\vfill
|
|
|
|
\newpage
|
|
\appendix
|
|
|
|
\section{Notation summary}
|
|
|
|
The paper uses the subscript $p$ to indicate public keys and $s$ to
|
|
indicate secret (private) keys. For keys, we also use small letters
|
|
for scalars and capital letters for points on an elliptic curve. The
|
|
capital letter without the subscript $p$ stands for the key pair. The
|
|
superscript $(i)$ is used to indicate one of the elements of a vector
|
|
during the cut-and-choose protocol. Bold-face is used to indicate a
|
|
vector over these elements. A line above indicates a value computed
|
|
by the verifier during the cut-and-choose operation. We use $f()$ to
|
|
indicate the application of a function $f$ to one or more arguments. Records of
|
|
data being committed to disk are represented in between $\langle\rangle$.
|
|
|
|
\begin{description}
|
|
\item[$K_s$]{Denomination private (RSA) key of the exchange used for coin signing}
|
|
\item[$K_p$]{Denomination public (RSA) key corresponding to $K_s$}
|
|
\item[$K$]{Public-priate (RSA) denomination key pair $K := (K_s, K_p)$}
|
|
\item[$b$]{RSA blinding factor for RSA-style blind signatures}
|
|
\item[$B_b()$]{RSA blinding over the argument using blinding factor $b$}
|
|
\item[$U_b()$]{RSA unblinding of the argument using blinding factor $b$}
|
|
\item[$S_K()$]{Chaum-style RSA signature, $S_K(C) = U_b(S_K(B_b(C)))$}
|
|
\item[$w_s$]{Private key from customer for authentication}
|
|
\item[$W_p$]{Public key corresponding to $w_s$}
|
|
\item[$W$]{Public-private customer authentication key pair $W := (w_s, W_p)$}
|
|
\item[$S_W()$]{Signature over the argument(s) involving key $W$}
|
|
\item[$m_s$]{Private key from merchant for authentication}
|
|
\item[$M_p$]{Public key corresponding to $m_s$}
|
|
\item[$M$]{Public-private merchant authentication key pair $M := (m_s, M_p)$}
|
|
\item[$S_M()$]{Signature over the argument(s) involving key $M$}
|
|
\item[$G$]{Generator of the elliptic curve}
|
|
\item[$c_s$]{Secret key corresponding to a coin, scalar on a curve}
|
|
\item[$C_p$]{Public key corresponding to $c_s$, point on a curve}
|
|
\item[$C$]{Public-private coin key pair $C := (c_s, C_p)$}
|
|
\item[$S_{C}()$]{Signature over the argument(s) involving key $C$ (using EdDSA)}
|
|
\item[$c_s'$]{Private key of a ``dirty'' coin (otherwise like $c_s$)}
|
|
\item[$C_p'$]{Public key of a ``dirty'' coin (otherwise like $C_p$)}
|
|
\item[$C'$]{Dirty coin (otherwise like $C$)}
|
|
\item[$\widetilde{C}$]{Exchange signature $S_K(C_p)$ indicating validity of a fresh coin (with key $C$)}
|
|
\item[$n$]{Number of exchanges accepted by a merchant}
|
|
\item[$j$]{Index into a set of accepted exchanges, $i \in \{1,\ldots,n\}$}
|
|
\item[$X_j$]{Public key of a exchange (not used to sign coins)}
|
|
\item[$\vec{X}$]{Vector of $X_j$ signifying exchanges accepted by a merchant}
|
|
\item[$a$]{Complete text of a contract between customer and merchant}
|
|
\item[$f$]{Amount a customer agrees to pay to a merchant for a contract}
|
|
\item[$m$]{Unique transaction identifier chosen by the merchant}
|
|
\item[$H()$]{Hash function}
|
|
\item[$p$]{Payment details of a merchant (i.e. wire transfer details for a bank transfer)}
|
|
\item[$r$]{Random nonce}
|
|
\item[${\cal A}$]{Complete contract signed by the merchant}
|
|
\item[${\cal D}$]{Deposit permission, signing over a certain amount of coin to the merchant as payment and to signify acceptance of a particular contract}
|
|
\item[$\kappa$]{Security parameter $\ge 3$}
|
|
\item[$i$]{Index over cut-and-choose set, $i \in \{1,\ldots,\kappa\}$}
|
|
\item[$\gamma$]{Selected index in cut-and-choose protocol, $\gamma \in \{1,\ldots,\kappa\}$}
|
|
\item[$t^{(i)}_s$]{private transfer key, a scalar}
|
|
\item[$T^{(i)}_p$]{public transfer key, point on a curve (same curve must be used for $C_p$)}
|
|
\item[$T^{(i)}$]{public-private transfer key pair $T^{(i)} := (t^{(i)}_s,T^{(i)}_s)$}
|
|
\item[$\vec{t}$]{Vector of $t^{(i)}_s$}
|
|
\item[$c_s^{(i)}$]{Secret key corresponding to a fresh coin, scalar on a curve}
|
|
\item[$C_p^{(i)}$]{Public key corresponding to $c_s^{(i)}$, point on a curve}
|
|
\item[$C^{(i)}$]{Public-private coin key pair $C^{(i)} := (c_s^{(i)}, C_p^{(i)})$}
|
|
% \item[$\vec{C}$]{Vector of $C^{(i)}$ (public and private keys)}
|
|
\item[$b^{(i)}$]{Blinding factor for RSA-style blind signatures}
|
|
\item[$\vec{b}$]{Vector of $b^{(i)}$}
|
|
\item[$B^{(i)}$]{Blinding of $C_p^{(i)}$}
|
|
\item[$\vec{B}$]{Vector of $B^{(i)}$}
|
|
\item[$L^{(i)}$]{Link secret derived from ECDH operation via hashing}
|
|
% \item[$E_{L^{(i)}}()$]{Symmetric encryption using key $L^{(i)}$}
|
|
% \item[$E^{(i)}$]{$i$-th encryption of the private information $(c_s^{(i)}, b_i)$}
|
|
% \item[$\vec{E}$]{Vector of $E^{(i)}$}
|
|
\item[$\cal{R}$]{Tuple of revealed vectors in cut-and-choose protocol,
|
|
where the vectors exclude the selected index $\gamma$}
|
|
\item[$\overline{L^{(i)}}$]{Link secrets derived by the verifier from DH}
|
|
\item[$\overline{B^{(i)}}$]{Blinded values derived by the verifier}
|
|
\item[$\overline{T_p^{(i)}}$]{Public transfer keys derived by the verifier from revealed private keys}
|
|
\item[$\overline{c_s^{(i)}}$]{Private keys obtained from decryption by the verifier}
|
|
\item[$\overline{b_s^{(i)}}$]{Blinding factors obtained from decryption by the verifier}
|
|
\item[$\overline{C^{(i)}_p}$]{Public coin keys computed from $\overline{c_s^{(i)}}$ by the verifier}
|
|
\end{description}
|
|
|
|
|
|
|
|
\end{document}
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
\section{Optional features}
|
|
|
|
In this appendix we detail various optional features that can
|
|
be added to the basic protocol to reduce transaction costs for
|
|
certain interactions.
|
|
|
|
However, we note that Taler's transaction costs are expected to be so
|
|
low that these features are likely not particularly useful in
|
|
practice: When we performed some initial performance measurements for
|
|
the various operations on our exchange implementation, the main conclusion
|
|
was that the computational and bandwidth cost for transactions
|
|
described in this paper is smaller than $10^{-3}$ cent/transaction,
|
|
and thus dwarfed by the other business costs for the exchange. We note
|
|
that the $10^{-3}$ cent/transaction estimate excludes the cost of wire
|
|
transfers using traditional banking, which a exchange operator would
|
|
ultimately have to interact with. Here, exchange operators should be able
|
|
to reduce their expenses by aggregating multiple transfers to the same
|
|
merchant.
|
|
|
|
As a result of the low cost of the interaction with the exchange in Taler
|
|
today, we expect that transactions with amounts below Taler's internal
|
|
transaction costs to be economically meaningless. Nevertheless, we
|
|
document various ways how such transactions could be achieved within
|
|
Taler.
|
|
|
|
|
|
|
|
\subsection{Incremental spending}
|
|
|
|
For services that include pay-as-you-go billing, customers can over
|
|
time sign deposit permissions for an increasing fraction of the value
|
|
of a coin to be paid to a particular merchant. As checking with the
|
|
exchange for each increment might be expensive, the coin's owner can
|
|
instead sign a {\em lock permission}, which allows the merchant to get
|
|
an exclusive right to redeem deposit permissions for the coin for a
|
|
limited duration. The merchant uses the lock permission to determine
|
|
if the coin has already been spent and to ensure that it cannot be
|
|
spent by another merchant for the {\em duration} of the lock as
|
|
specified in the lock permission. If the coin has insufficient funds
|
|
because too much has been spent or is
|
|
already locked, the exchange provides the owner's deposit or locking
|
|
request and signature to prove the attempted fraud by the customer.
|
|
Otherwise, the exchange locks the coin for the expected duration of the
|
|
transaction (and remembers the lock permission). The merchant and the
|
|
customer can then finalize the business transaction, possibly
|
|
exchanging a series of incremental payment permissions for services.
|
|
Finally, the merchant then redeems the coin at the exchange before the
|
|
lock permission expires to ensure that no other merchant redeems the
|
|
coin first.
|
|
|
|
\begin{enumerate}
|
|
\item\label{offer2} The merchant sends an \emph{offer:}
|
|
$\langle S_M(m, f), \vec{X} \rangle$ containing the price of the offer $f$,
|
|
a transaction ID $m$ and the list of exchanges
|
|
$\vec{X} = \langle X_1, \ldots, X_n \rangle$ accepted by the merchant,
|
|
where each $X_j$ is a exchange's public key.
|
|
\item\label{lock2} The customer must possess or acquire a coin $\widetilde{C}$
|
|
signed by a exchange that is accepted by the merchant,
|
|
i.e.\ $K$ should be signed by some $X_j$ and has a value $\geq f$.
|
|
|
|
Customer then generates a \emph{lock-permission}
|
|
$\mathcal{L} := S_c(\widetilde{C}, t, m, f, M_p)$ where
|
|
$t$ specifies the time until which the lock is valid and sends
|
|
$\langle \mathcal{L}, X_j\rangle$ to the merchant,
|
|
where $X_j$ is the exchange which signed $K$.
|
|
\item The merchant asks the exchange to apply the lock by sending $\langle
|
|
\mathcal{L} \rangle$ to the exchange.
|
|
\item The exchange validates $\widetilde{C}$ and detects double spending
|
|
in the form of existing \emph{deposit-permission} or
|
|
lock-permission records for $\widetilde{C}$. If such records exist
|
|
and indicate that insufficient funds are left, the exchange sends those
|
|
records to the merchant, who can then use the records to prove the double
|
|
spending to the customer.
|
|
|
|
If double spending is not found,
|
|
the exchange commits $\langle \mathcal{L} \rangle$ to disk
|
|
and notifies the merchant that locking was successful.
|
|
\item\label{contract2} The merchant creates a digitally signed contract
|
|
$\mathcal{A} := S_M(m, f, a, H(p, r))$ where $a$ is data relevant to the contract
|
|
indicating which services or goods the merchant will deliver to the customer, and $p$ is the
|
|
merchant's payment information (e.g. his IBAN number) and $r$ is an random nonce.
|
|
The merchant commits $\langle \mathcal{A} \rangle$ to disk and sends it to the customer.
|
|
\item The customer creates a
|
|
\emph{deposit-permission} $\mathcal{D} := S_c(\widetilde{C}, \widetilde{L}, f, m, M_p, H(a), H(p, r))$, commits
|
|
$\langle \mathcal{A}, \mathcal{D} \rangle$ to disk and sends $\mathcal{D}$ to the merchant.
|
|
\item\label{invoice_paid2} The merchant commits the received $\langle \mathcal{D} \rangle$ to disk.
|
|
\item The merchant gives $(\mathcal{D}, p, r)$ to the exchange, revealing his
|
|
payment information.
|
|
\item The exchange verifies $(\mathcal{D}, p, r)$ for its validity and
|
|
checks against double spending, while of
|
|
course permitting the merchant to withdraw funds from the amount that
|
|
had been locked for this merchant.
|
|
\item If $\widetilde{C}$ is valid and no equivalent \emph{deposit-permission} for $\widetilde{C}$ and $\widetilde{L}$ exists on disk, the
|
|
exchange performs the following transaction:
|
|
\begin{enumerate}
|
|
\item $\langle \mathcal{D}, p, r \rangle$ is committed to disk.
|
|
\item\label{transfer2} transfers an amount of $f$ to the merchant's bank account
|
|
given in $p$. The subject line of the transaction to $p$ must contain
|
|
$H(\mathcal{D})$.
|
|
\end{enumerate}
|
|
Finally, the exchange sends a confirmation to the merchant.
|
|
\item If the deposit record $\langle \mathcal{D}, p, r \rangle$ already exists,
|
|
the exchange sends the confirmation to the merchant,
|
|
but does not transfer money to $p$ again.
|
|
\end{enumerate}
|
|
|
|
To facilitate incremental spending of a coin $C$ in a single transaction, the
|
|
merchant makes an offer in Step~\ref{offer2} with a maximum amount $f_{max}$ he
|
|
is willing to charge in this transaction from the coin $C$. After obtaining the
|
|
lock on $C$ for $f_{max}$, the merchant makes a contract in Step~\ref{contract2}
|
|
with an amount $f \leq f_{max}$. The protocol follows with the following steps
|
|
repeated after Step~\ref{invoice_paid2} whenever the merchant wants to charge an
|
|
incremental amount up to $f_{max}$:
|
|
|
|
\begin{enumerate}
|
|
\setcounter{enumi}{4}
|
|
\item The merchant generates a new contract $ \mathcal{A}' := S_M(m, f', a', H(p,
|
|
r)) $ after obtaining the deposit-permission for a previous contract. Here
|
|
$f'$ is the accumulated sum the merchant is charging the customer, of which
|
|
the merchant has received a deposit-permission for $f$ from the previous
|
|
contract \textit{i.e.}~$f <f' \leq f_{max}$. Similarly $a'$ is the new
|
|
contract data appended to older contract data $a$.
|
|
The merchant commits $\langle \mathcal{A}' \rangle$ to disk and sends it to the customer.
|
|
\item Customer commits $\langle \mathcal{A}' \rangle$ to disk, creates
|
|
$\mathcal{D}' := S_c(\widetilde{C}, \mathcal{L}, f', m, M_p, H(a'), H(p, r))$, commits
|
|
$\langle \mathcal{D'} \rangle$ and sends it to the merchant.
|
|
\item The merchant commits the received $\langle \mathcal{D'} \rangle$ and
|
|
deletes the older $\mathcal{D}$.
|
|
\end{enumerate}
|
|
|
|
%Figure~\ref{fig:spending_protocol_interactions} summarizes the interactions of the
|
|
%coin spending protocol.
|
|
|
|
For transactions with multiple coins, the steps of the protocol are
|
|
executed in parallel for each coin. During the time a coin is locked,
|
|
the locked fraction may not be spent at a different merchant or via a
|
|
deposit permission that does not contain $\mathcal{L}$. The exchange will
|
|
release the locks when they expire or are used in a deposit operation.
|
|
Thus the coins can be used with other merchants once their locks
|
|
expire, even if the original merchant never executed any deposit for
|
|
the coin. However, doing so may link the new transaction to older
|
|
transaction.
|
|
|
|
Similarly, if a transaction is aborted after Step 2, subsequent
|
|
transactions with the same coin can be linked to the coin, but not
|
|
directly to the coin's owner. The same applies to partially spent
|
|
coins. Thus, to unlink subsequent transactions from a coin, the
|
|
customer has to execute the coin refreshing protocol with the exchange.
|
|
|
|
%\begin{figure}[h]
|
|
%\centering
|
|
%\begin{tikzpicture}
|
|
%
|
|
%\tikzstyle{def} = [node distance= 1em, inner sep=.5em, outer sep=.3em];
|
|
%\node (origin) at (0,0) {};
|
|
%\node (offer) [def,below=of origin]{make offer (merchant $\rightarrow$ customer)};
|
|
%\node (A) [def,below=of offer]{permit lock (customer $\rightarrow$ merchant)};
|
|
%\node (B) [def,below=of A]{apply lock (merchant $\rightarrow$ exchange)};
|
|
%\node (C) [def,below=of B]{confirm (or refuse) lock (exchange $\rightarrow$ merchant)};
|
|
%\node (D) [def,below=of C]{sign contract (merchant $\rightarrow$ customer)};
|
|
%\node (E) [def,below=of D]{permit deposit (customer $\rightarrow$ merchant)};
|
|
%\node (F) [def,below=of E]{make deposit (merchant $\rightarrow$ exchange)};
|
|
%\node (G) [def,below=of F]{transfer confirmation (exchange $\rightarrow$ merchant)};
|
|
%
|
|
%\tikzstyle{C} = [color=black, line width=1pt]
|
|
%\draw [->,C](offer) -- (A);
|
|
%\draw [->,C](A) -- (B);
|
|
%\draw [->,C](B) -- (C);
|
|
%\draw [->,C](C) -- (D);
|
|
%\draw [->,C](D) -- (E);
|
|
%\draw [->,C](E) -- (F);
|
|
%\draw [->,C](F) -- (G);
|
|
%
|
|
%\draw [->,C, bend right, shorten <=2mm] (E.east)
|
|
% to[out=-135,in=-45,distance=3.8cm] node[left] {aggregate} (D.east);
|
|
%\end{tikzpicture}
|
|
%\caption{Interactions between a customer, merchant and exchange in the coin spending
|
|
% protocol}
|
|
%\label{fig:spending_protocol_interactions}
|
|
%\end{figure}
|
|
|
|
|
|
\subsection{Probabilistic donations}
|
|
|
|
Similar to Peppercoin, Taler supports probabilistic {\em micro}donations of coins to
|
|
support cost-effective transactions for small amounts. We consider
|
|
amounts to be ``micro'' if the value of the transaction is close or
|
|
even below the business cost of an individual transaction to the exchange.
|
|
|
|
To support microdonations, an ordinary transaction is performed based
|
|
on the result of a biased coin flip with a probability related to the
|
|
desired transaction amount in relation to the value of the coin. More
|
|
specifically, a microdonation of value $\epsilon$ is upgraded to a
|
|
macropayment of value $m$ with a probability of $\frac{\epsilon}{m}$.
|
|
Here, $m$ is chosen such that the business transaction cost at the
|
|
exchange is small in relation to $m$. The exchange is only involved in the
|
|
tiny fraction of transactions that are upgraded. On average both
|
|
customers and merchants end up paying (or receiving) the expected
|
|
amount $\epsilon$ per microdonation.
|
|
|
|
Unlike Peppercoin, in Taler either the merchant wins and the customer
|
|
looses the coin, or the merchant looses and the customer keeps the
|
|
coin. Thus, there is no opportunity for the merchant and the customer
|
|
to conspire against the exchange. To determine if the coin is to be
|
|
transferred, merchant and customer execute a secure coin flipping
|
|
protocol~\cite{blum1981}. The commit values are included in the
|
|
business contract and are revealed after the contract has been signed
|
|
using the private key of the coin. If the coin flip is decided in
|
|
favor of the merchant, the merchant can redeem the coin at the exchange.
|
|
|
|
One issue in this protocol is that the customer may use a worthless
|
|
coin by offering a coin that has already been spent. This kind of
|
|
fraud would only be detected if the customer actually lost the coin
|
|
flip, and at this point the merchant might not be able to recover from
|
|
the loss. A fraudulent anonymous customer may run the protocol using
|
|
already spent coins until the coin flip is in his favor.
|
|
|
|
As with incremental spending, lock permissions could be used to ensure
|
|
that the customer cannot defraud the merchant by offering a coin that
|
|
has already been spent. However, as this means involving the exchange
|
|
even if the merchant looses the coin flip, such a scheme is unsuitable
|
|
for microdonations as the transaction costs from involving the exchange
|
|
might be disproportionate to the value of the transaction, and thus
|
|
with locking the probabilistic scheme has no advantage over simply
|
|
using fractional payments.
|
|
|
|
Hence, Taler uses probabilistic transactions {\em without} online
|
|
double-spending detection. This enables the customer to defraud the
|
|
merchant by paying with a coin that was already spent. However, as,
|
|
by definition, such microdonations are for tiny amounts, the incentive
|
|
for customers to pursue this kind of fraud is limited. Still, to
|
|
clarify that the customer must be honest, we prefer the term
|
|
micro{\em donations} over micro{\em payments} for this scheme.
|
|
|
|
|
|
The following steps are executed for microdonations with upgrade probability $p$:
|
|
\begin{enumerate}
|
|
\item The merchant sends an offer to the customer.
|
|
\item The customer sends a commitment $H(r_c)$ to a random
|
|
value $r_c \in [0,2^R)$, where $R$ is a system parameter.
|
|
\item The merchant sends random $r_m \in [0,2^R)$ to the customer.
|
|
\item The customer computes $p' := (|r_c - r_m|) / (2^R)$.
|
|
If $p' < p$, the customer sends a coin with deposit-permission to the merchant.
|
|
Otherwise, the customer sends $r_c$ to the merchant.
|
|
\item The merchant deposits the coin, or checks if $r_c$ is consistent
|
|
with $H(r_c)$.
|
|
\end{enumerate}
|
|
|
|
Evidently the customer can ``cheat'' by aborting the transaction in
|
|
Step 3 of the microdonation protocol if the outcome is unfavorable ---
|
|
and repeat until he wins. This is why Taler is suitable for
|
|
microdonations --- where the customer voluntarily contributes ---
|
|
and not for micropayments.
|
|
|
|
Naturally, if the donations requested are small, the incentive to
|
|
cheat for minimal gain should be quite low. Payment software could
|
|
embrace this fact by providing an appeal to conscience in form of an
|
|
option labeled ``I am unethical and want to cheat'', which executes
|
|
the dishonest version of the payment protocol.
|
|
|
|
If an organization detects that it cannot support itself with
|
|
microdonations, it can always choose to switch to the macropayment
|
|
system with slightly higher transaction costs to remain in business.
|
|
|
|
\newpage
|
|
|
|
|
|
|
|
Taler was designed for use in a modern social-liberal society and
|
|
provides a payment system with the following key properties:
|
|
|
|
\begin{description}
|
|
\item[Customer Anonymity]
|
|
It is impossible for exchanges, merchants and even a global active
|
|
adversary, to trace the spending behavior of a customer.
|
|
As a strong form of customer anonymity, it is also infeasible to
|
|
link a set of transactions to the same (anonymous) customer.
|
|
%, even when taking aborted transactions into account.
|
|
|
|
There is, however, a risk of metadata leakage if a customer
|
|
acquires coins matching exactly the price quoted by a merchant, or
|
|
if a customer uses coins issued by multiple exchanges for the same
|
|
transaction. Hence, our implementation does not allow this.
|
|
|
|
\item[Taxability]
|
|
In many current legal systems, it is the responsibility of the merchant
|
|
to deduct sales taxes from purchases made by customers, or for workers
|
|
to pay income taxes for payments received for work.
|
|
Taler ensures that merchants are easily identifiable and that
|
|
an audit trail is generated, so that the state can ensure that its
|
|
taxation regime is obeyed.
|
|
\item[Verifiability]
|
|
Taler minimizes the trust necessary between
|
|
participants. In particular, digital signatures are retained
|
|
whenever they would play a role in resolving disputes.
|
|
Additionally, customers cannot defraud anyone, and
|
|
merchants can only defraud their customers by not
|
|
delivering on the agreed contract. Neither merchants nor customers
|
|
are able to commit fraud against the exchange.
|
|
Only the exchange needs be tightly audited and regulated.
|
|
\item[No speculation] % It's actually "Specualtion not required"
|
|
The digital coins are denominated in existing currencies,
|
|
such as EUR or USD. This avoids exposing citizens to unnecessary risks
|
|
from currency fluctuations.
|
|
\item[Low resource consumption]
|
|
The design minimizes the operating costs and environmental impact of
|
|
the payment system. It uses few public key operations per
|
|
transaction and entirely avoids proof-of-work computations.
|
|
The payment system handles both small and large payments in
|
|
an efficient and reliable manner.
|
|
\end{description}
|