\documentclass{llncs} %\usepackage[margin=1in,a4paper]{geometry} \usepackage[T1]{fontenc} \usepackage{palatino} \usepackage{xspace} \usepackage{microtype} \usepackage{tikz} \usepackage{amsmath,amssymb} \usepackage{enumitem} \usetikzlibrary{shapes,arrows} \usetikzlibrary{positioning} \usetikzlibrary{calc} % Terminology: % - SEPA-transfer -- avoid 'SEPA transaction' as we use % 'transaction' already when we talk about taxable % transfers of Taler coins and database 'transactions'. % - wallet = coins at customer % - reserve = currency entrusted to mint waiting for withdrawl % - deposit = SEPA to mint % - withdrawl = mint to customer % - spending = customer to merchant % - redeeming = merchant to mint (and then mint SEPA to merchant) % - refreshing = customer-mint-customer % - dirty coin = coin with exposed public key % - fresh coin = coin that was refreshed or is new % - coin signing key = mint's online key used to (blindly) sign coin % - message signing key = mint's online key to sign mint messages % - mint master key = mint's key used to sign other mint keys % - owner = entity that knows coin private key % - transaction = coin ownership transfer that should be taxed % - sharing = coin copying that should not be taxed \title{Taler: Taxable Anonymous Libre Electronic Reserves} \begin{document} \mainmatter %\author{Florian Dold \and Sree Harsha Totakura \and Benedikt M\"uller \and Christian Grothoff} %\institute{The GNUnet Project} \maketitle \begin{abstract} This paper introduces Taler, a Chaum-style digital currency using blind signatures that enables anonymous payments while ensuring that entities that receive payments are auditable and thus taxable. Taler differs from Chaum's original proposal in that customers can never defraud anyone, merchants can only fail to deliver the merchandise to the customer, and mints can be fully audited. Consequently, enforcement of honest behavior is better and more timely than with Chaum, and is at least as strict as with legacy credit card payment systems that do not provide for privacy. Furthermore, Taler allows fractional and incremental payments, and even in this case is still able to guarantee unlinkability of transactions via a new coin refreshing protocol. Finally, Taler also supports microdonations using probabilistic transactions. We argue that Taler provides a secure digital currency for modern liberal societies as it is a flexible, libre and efficient protocol and adequately balances the state's need for monetary control with the citizen's needs for private economic activity. \end{abstract} \section{Introduction} The design of payment systems shapes economies and societies. Strong, developed nation states are evolving towards fully transparent payment systems, such as the MasterCard and VisaCard credit card schemes and computerized bank transactions such as SWIFT. Such systems enable mass surveillance and thus extensive government control over the economy, from taxation to intrusion into private lives. Bribery and corruption are limited to elites that can afford to escape the dragnet. The other extreme are economies of developing, weak nation states where economic activity is based largely on coins, paper money or even barter. Here, the state is often unable to effectively monitor or tax economic activity, and this limits the ability of the state to shape the society. As bribery is virtually impossible to detect, it is widespread and not limited to social elites. ZeroCoin~\cite{miers2013zerocoin} is an example for translating such an economy into the digital realm. Taler is supposed to offer a middleground between an authoritarian state in total control of the population and weak states with almost anarchistic economies. Specifically, we believe that a liberal democracy needs a payment system with the following properties: \begin{description} \item[Customer Anonymity] It must be impossible for mints, merchants and even a global active adversary, to trace the spending behavior of a customer. \item[Unlinkability] Merchants must not be able to tell if two transactions were performed by the same customer. It must be infeasible to link a set of transactions to the same (anonymous) customer. %, even when taking aborted transactions into account. \item[Taxability] In many current legal systems, it is the responsibility of the merchant to deduct (sales) taxes from purchases made by customers, or to pay (income) taxes for payments received for work. %Taxation is neccessary for the state to %provide legitimate social functions, such as education. Thus, a payment %system must facilitate sales, income and transaction taxes. This specifically means that it must be able to audit merchants (or generally anybody receiving money), and thus the receiver of electronic cash must be easily identifiable. %non-anonymous, as this would enable tax fraud. \item[Verifiability] The payment system should try to minimize the trust necessary between the participants. In particular, digital signatures should be used extensively in order to be able to resolve disputes between the involved parties. Nevertheless, customers must never be able to defraud anyone, and merchants must at best be able to defraud their customers by not delivering the on the agreed contract. Neither merchants nor customers must ever be able to commit fraud against the mint. Both customers and merchants must receive cryptographic proofs of bad behavior in case of protocol violations by the mint. Thus, only the mint will have to be tightly audited and regulated. The design must make it easy to audit the finances of the mint. \item[Ease of Deployment] %The system should be easy to deploy for % real-world applications. In order to lower the entry barrier and % acceptance of the system, a gateway to the existing financial % system should be provided, i.e. by integrating internet-banking % protocols such as HBCI/FinTAN. The digital currency should be tied 1:1 to existing currencies (such as EUR or USD) to avoid exposing users to unnecessary risks from currency fluctuations. Moreover, the system must have a free software reference implementation and an open protocol standard. % The protocol should % be able to run easily over HTTP(S). \item[Low resource consumption] In order to minimize the operating costs and environmental impact of the payment system, it must avoid the reliance on expensive and ``wasteful'' computations such as proof-of-work. \item[Large Payments and Microdonations] The payment system needs to handle large payments in a reliable manner. Furthermore, for microdonations the system should allow sacrificing reliability to achieve economic viability. \end{description} Taler builds on ideas from Chaum~\cite{chaum1983blind}, who proposed a digital currency system that would provide (some) customer anonymity while disclosing the identity of the merchants. Chaum's digital cash system had some limitations and ultimately failed to be widely adopted. In our assessment, key reasons include: \begin{itemize} \item The use of patents to protect the technology; a payment system must be libre --- free software --- to have a chance for widespread adoption. \item The use of off-line payments and thus deferred detection of double-spending, which could require the mint to attempt to recover funds from customers via the legal system. This creates a significant business risk for the mint, as the system is not self-enforcing from the perspective of the mint. In 1983 off-line payments might have been a necessary feature. However, today requiring network connectivity is feasible and avoids the business risks associated with deferred fraud detection. \item % In addition to the risk of legal disputes with fradulent % merchants and customers, Chaum's published design does not clearly limit the financial damage a mint might suffer from the disclosure of its private online signing key. % \item Chaum did not support fractional payments, and Brand's % extensions for fractional payments broke unlinkability and thus % limited anonymity. Chaum also did not support microdonations, % leaving an opportunity for expanding payments into additional areas % unexplored. % \item Chaum's system was implemented at a time where the US market % was still dominated by paper checks and the European market was % fragmented into dozens of currencies. Today, SEPA provides a % unified currency and currency transfer method for most of Europe, % significantly lowering the barrier to entry into this domain for % a larger market. \end{itemize} This paper describes Taler, a simple and practical payment with the above goals in mind. The basic idea is to use Chaum's model of customer, merchant and mint (Figure~\ref{fig:cmm}) where the customer withdraws digital currency from the mint with unlinkability provided via blind signatures. In contrast to Chaum, Taler uses online detection of double-spending, thus ensuring the merchant instantly that a transaction is valid. Instead of using cryptographic methods to enable fractional payments, the customer can simply include the fraction of a coin's value that is to be paid to the merchant in his message to the merchant. \begin{figure}[h] \centering \begin{tikzpicture} \tikzstyle{def} = [node distance= 7em and 10em, inner sep=1em, outer sep=.3em]; \node (origin) at (0,0) {}; \node (mint) [def,above=of origin,draw]{Mint}; \node (customer) [def, draw, below left=of origin] {Customer}; \node (merchant) [def, draw, below right=of origin] {Merchant}; \tikzstyle{C} = [color=black, line width=1pt] \draw [<-, C] (customer) -- (mint) node [midway, above, sloped] (TextNode) {withdraw coins}; \draw [<-, C] (mint) -- (merchant) node [midway, above, sloped] (TextNode) {deposit coins}; \draw [<-, C] (merchant) -- (customer) node [midway, above, sloped] (TextNode) {spend coins}; \end{tikzpicture} \caption{Taler's system model for the payment system is based on Chaum~\cite{chaum1983blind}.} \label{fig:cmm} \end{figure} Online fraud detection can create problems if the network fails during the initial steps of a transaction. For example, a law enforcement agency might try to entrap a customer by offering illicit goods and then aborting the transaction after learning the public key of the coin. If the customer were to then later spend that coin on a purchase with shipping, the law enforcement agency could link the two transactions and might be able to use the shipping to deanonymize the customer. Similarly, fractional payments also lead to the possibility of customers wanting to legitimately use the same coin twice. Taler addresses this problem by allowing customers to {\em refresh} coins. Refreshing means that a customer is able to exchange one coin for a fresh coin, with the old and the new coin being unlinkable (except for the customer himself). Taler ensures that the {\em entity} of the user owning the new coin is the same as the entity of the user owning the old coin, thus making sure that the refreshing protocol cannot be abused for money laundering or other illicit transactions. \section{Related Work} \subsection{Blockchain-based currencies} In recent years, a class of decentralized electronic payment systems, based on collectively recorded and verified append-only public ledgers, have gained immense popularity. The most well-known protocol in this class is Bitcoin~\cite{nakamoto2008bitcoin}. An initial concern with Bitcoin was the lack of anonymity, as all Bitcoin transactions are recorded for eternity, which can enable identification of users. In theory, this concern has been addressed with the Zerocoin extension to the protocol~\cite{miers2013zerocoin}. While these protocols dispense with the need for a central, trusted authority and provide anonymity, we argue there are some major, irredeemable problems inherent in these systems: \begin{itemize} \item Bitcoins are not (easily) taxable. The legality and legitimacy of this aspect is questionable. The Zerocoin extension would only make this worse. \item Bitcoins can not be bound to any fiat currency, and are subject to significant value fluctuations. While such fluctuations may be acceptable for high-risk investments, they make Bitcoin unsuitable as a medium of exchange. \item The computational puzzles solved by Bitcoin nodes with the purpose of securing the block chain consume a considerable amount of computational resources and thus energy. Thus, Bitcoin does not represent an environmentally responsible design. \item Anyone can easily start an alternative Bitcoin transaction chain (a so-called AltCoin) and, if successful, reap the benefits of the low cost to initially create coins via computation. As a result, dozens of AltCoins have been created, often without any significant changes to the technology. A large number of AltCoins creates additional overheads for currency exchange and exascerbates the problems with currency fluctuations. \end{itemize} \subsection{Chaum-style electronic cash} Chaum's original digital cash system~\cite{chaum1983blind} was extended by Brands~\cite{brands1993efficient} with the ability to perform fractional payments; however, the transactions performed with the same coin then become linkable. % %Some argue that the focus on technically perfect but overwhelmingly %complex protocols, as well as the the lack of usable, practical %solutions lead to an abandonment of these ideas by %practitioners~\cite{selby2004analyzing}. % To our knowledge, the only publicly available effort to implement Chaum's idea is Opencoin~\cite{dent2008extensions}. However, Opencoin seems to be neither actively developed nor used, and it is not clear to what degree the implementation is even complete. Only a partial description of the Opencoin protocol is available to date. \subsection{Peppercoin} Peppercoin~\cite{rivest2004peppercoin} is a microdonation protocol. The main idea of the protocol is to reduce transaction costs by minimizing the number of transactions that are processed directly by the mint. Instead of always paying, the customer ``gambles'' with the merchant for each microdonation. Only if the merchant wins, the microdonation is upgraded to a macropayment to be deposited at the mint. Peppercoin does not provide customer-anonymity. The proposed statistical method for mints detecting fraudulent cooperation between customers and merchants at the expense of the mint not only creates legal risks for the mint (who has to make a statistical argument), but also would require the mint to learn about microdonations where the merchant did not get upgraded to a macropayment. Thus, it is unclear how much Peppercoin would actually do to reduce the computational burden on the mint. \section{Design} The payment system we propose is built on the blind signature primitive proposed by Chaum, but extended with additional constructions to provide unlinkability, online fraud detection and taxability. As with Chaum, the Taler system comprises three principal types of actors: The \emph{customer} is interested in receiving goods or services from the \emph{merchant} in exchange for payment. When making a transaction, both the customer and the merchant must agree on the same \emph{mint}, which serves as an intermediary for the financial transaction between the two. The mint is responsible for allowing the customer to obtain the anonymous digital currency and for enabling the merchant to convert the anonymous digital currency back to some traditional currency. \subsection{Security model} Taler's security model assumes that cryptographic primitives are secure and that each participant is under full control of his system. The contact information of the mint is known to both customer and merchant from the start. Furthermore, the merchant is known to the customer and we assume that an anonymous, reliable bi-directional communication channel can be established by the customer to both the mint and the merchant. The mint is trusted to hold funds of its customers and to forward them when receiving the respective deposit instructions from the merchants. Customer and merchant can have some assurances about the mint's liquidity and operation, as the mint has proven reserves, is subject to the law, and can have its business is regularly audited (for example, by the government or a trusted third party auditor). Audits of the mint's accounts must reveal any possible fraud. % The merchant is trusted to deliver the service or goods to the customer upon receiving payment. The customer can seek legal relief to achieve this, as he must get cryptographic proofs of the contract and that he paid his obligations. % Neither the merchant nor the customer may have any ability to {\em effectively} defraud the mint or the state collecting taxes. Here, ``effectively'' means that the expected return for fraud is negative. % Note that customers do not need to be trusted in any way, and that in particular it is never necessary for anyone to try to recover funds from customers using legal means. \subsection{Taxability and Entities} Electronic coins are trivially copied between machines. Thus, we must clarify what kinds of operations can even be expected to be taxed. After all, without instrusive measures to take away control of the computing platform from its users, copying an electronic wallet from one computer to another can hardly be prevented by a payment system. Furthermore, it would also hardly be appropriate to tax the moving of funds between two computers owned by the same individual. We thus need to clarify which kinds of transfers we expect to tax. Taler is supposed to ensure that the state can tax {\em transactions}. We define a transaction as the transfer of funds between {\em mutually distrustful} entities. Two entities are assumed to be mutually distrustful if they are unwilling to share control over assets. If a private key is shared between two entities, then both entities have equal access to the credentials represented by the private key. In a payment system this means that either entity could spent the associated funds. Assuming the payment system has effective double-spending detection, this means that either entity has to constantly fear that the funds might no longer be available to it. Thus, ``transferring'' funds by sharing a private key implies that receiving party must trust the sender. In Taler, making funds available by sharing a private key and thus sharing control is {\bf not} considered a {\em transaction} and thus {\bf not} recorded for taxation. A {\em transaction} is a transfer where it is assured that one entity gains control over funds while at the same time another entity looses control over those funds. Taler ensures taxability only when some entity acquires exclusive control over digital coins. For transactions, the state can obtain information from the mint (or the bank) that identifies the entity that received the digital coins as well as the exact value of those coins. Taler also allows the mint (and thus the state) to learn the value of digital coins withdrawn by a customer --- but not how, where or when they were spent. Finally, to enable audits, the current balance and profits of the mint are also easily determined. \subsection{Anonymity} An anonymous communication channel (e.g. via Tor~\cite{tor-design}) is used for all communication between the customer and the merchant. Thus, the customer can remain anonymous; however, the system does reveal that the customer is one of the patrons of the mint. Naturally, the customer-merchant operation might leak other information about the customer, such as a shipping address. Such purchase-specific information leakage is outside of the scope of this work. The customer may use an anonymous communication channel for the communication with the mint to avoid leaking IP address information; however, the mint will anyway be able to determine the customer's identity from the (SEPA) transfer that the customer initiates to obtain anonymous digital cash. The scheme is anonymous because the mint will be unable to link the known identity of the customer that withdrew anonymous digital currency to the {\em purchase} performed later at the merchant. % All the mint will be %able to confirm is that the customer is {\em one} of its patrons who %previously obtained the anonymous digital currency --- and of course %that the coin was not spent before. While the customer thus has anonymity for his purchase, the mint will always learn the merchant's identity (which is necessary for taxation), and thus the merchant has no reason to anonymize his communication with the mint. % Technically, the merchant could still %use an anonymous communication channel to communicate with the mint. %However, in order to receive the traditional currency the mint will %require (SEPA) account details for the deposit. %As both the initial transaction between the customer and the mint as %well as the transactions between the merchant and the mint do not have %to be done anonymously, there might be a formal business contract %between the customer and the mint and the merchant and the mint. Such %a contract may provide customers and merchants some assurance that %they will actually receive the traditional currency from the mint %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 mint to establish a reputation and to %minimize cost, it is more likely that the mint 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} is a digital token which derives its financial value from a signature on the coin's identifier by a mint. The mint is expected to have multiple {\em coin signing key} pairs available for signing, each representing a different coin denomination. The coin signing keys have an expiration date (typically measured in years), and coins signed with a coin signing key must be spent (or exchanged for new coins) before that expiration date. This allows the mint to limit the amount of state it needs to keep to detect double spending attempts. Furthermore, the mint is expected to use each coin signing key only for a limited number of coins, for example by limiting its use to sign coins to a week or a month. That way, if the private coin signing key were to be compromised, the mint can detect this once more coins are redeemed than the total that was signed into existence using the respective coin signing key. In this case, the mint can allow the original set of customers to exchange the coins that were signed with the compromised private key, while refusing further transactions from merchants if they involve those coins. As a result, the financial damage of loosing a private signing key can be limited to at most twice the amount originally signed with that key. To ensure that the mint does not enable deanonymization of users by signing each coin with a fresh coin signing key, the mint must publicly announce the coin signing keys in advance. Those announcements are expected to be signed with an off-line long-term private {\em master signing key} of the mint and possibly the auditor. Before a customer can withdraw a coin from the mint, he has to pay the mint the value of the coin, as well as processing fees. This is done using other means of payments, such as SEPA transfers~\cite{sepa}. The subject line of the transfer must contain {\em withdrawal authorization key}, a public key for digital signatures generated by the customer. When the mint receives a transfer with a public key in the subject, it adds the funds to a {\em reserve} identified by the withdrawl authorization key. By signing the withdrawl messages using the withdrawl authorization key, the customer can prove to the mint that he is authorized to withdraw anonymous digital coins from the reserve. The mint will record the withdrawl messages with the reserve record as proof that the anonymous digital coin was created for the correct customer. After a coin is minted, the customer is the only entity that knows the private key of the coin, making him the \emph{owner} of the coin. The coin can be identified by the mint by its public key; however, due to the use of blind signatures, the mint does not learn the public key during the minting process. Knowledge of the private key of the coin enables the owner to spent the coin. If the private key is shared with others, they also become owners of the coin. \subsection{Coin spending} To spend a coin, the coin's owner needs to sign a {\em deposit request} specifying the amount, the merchant's account information and a {\em business transaction-specific hash} using the coin's private key. A merchant can then transfer this permission of the coin's owner to the mint to obtain the amount in traditional currency. If the customer is cheating and the coin was already spent, the mint provides cryptographic proof of the fraud to the merchant, who will then refuse the transaction. % The mint is typically expected %to transfer the funds to the merchant using a SEPA transfer or similar %methods appropriate to the domain of the traditional currency. %The mint needs to ensure that a coin can only be spent once. This is %done by storing the public keys of all deposited coins (together with %the deposit request and the owner's signature confirming the %transaction). The mint's state can be limited as coins signed with %expired coin sigining keys do not have to be retained. \paragraph{Partial spending.} To allow exact payments without requiring the customer to keep a large amount of ``change'' in stock, the payment systems allows partial spending of coins. Consequently, the mint the must not only store the identifiers of spent coins, but also the fraction of the coin that has been spent. %\paragraph{Online checks.} % %For secure transactions (non-microdonations), the merchant is expected %to perform an online check to detect double-spending. In the simplest %case, the merchant simply directly confirms the validity of the %deposit permission signed by the coin's owner with the mint, and then %proceeds with the contract. \subsection{Refreshing Coins} In the payment scenarios there are several cases where a customer will reveal the public key of a coin to a merchant, but not ultimately sign over the full value of the coin. If the customer then continues to use the remainder of the value of the coin in other transactions, merchants and the mint could link the various transactions as they all share the same public key for the coin. Thus, the owner might want to exchange such a {\em dirty} coin for a {\em fresh} coin to ensure unlinkability of future transactions with the previous operation. Even if a coin is not dirty, the owner of a coin may want to exchange a coin if the respective coin signing key is about to expire. All of these operations are supported with the {\em coin refreshing protocol}, which allows the owner of a coin to exchange existing coins (or their remaining value) for fresh coins 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 taxes on this operation. Because of this, the refreshing protocol must assure that owner stays the same. After all, the coin refreshing protocol must not be usable for transactions, as transactions in Taler must be taxable. Thus, one main goal of the refreshing protocol is that the mint must not be able to link the fresh coin's public key to the public key of the dirty coin. The second main goal is to enable the mint to ensure that the owner of the dirty coin can determine the private key of the fresh coin. This way, refreshing cannot be used to construct a transaction --- the owner of the dirty coin remains in control of the fresh coin. As with other operations, the refreshing protocol must also protect the mint from double-spending; similarly, the customer has to have cryptographic evidence if there is any misbehaviour by the mint. Finally, the mint may choose to charge a transaction fee for refreshing by reducing the value of the generated fresh coins in relation to the value of the melted coins. %Naturally, all such transaction fees should be clearly stated as part %of the business contract offered by the mint to customers and %merchants. \section{Taler's Cryptographic Protocols} % In this section, we describe the protocols for Taler in detail. For the sake of brevity, we do not specifically state that the recipient of a signed message always first checks that the signature is valid. Also, whenever a signed message is transmitted, it is assumed that the receiver is told the public key (or knows it from the context) and that the signature contains additional identification as to the purpose of the signature (such that it is not possible to use a signature from one protocol step in a different context). When the mint signs messages (not coins), an {\em online message signing key} of the mint is used. The mint's long-term offline key is used to certify both the coin signing keys as well as the online message signing key of the mint. The mint's long-term offline key is assumed to be well-known to both customers and merchants, for example because it is certified by the auditors. As we are dealing with financial transactions, we explicitly state 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 cummulative, 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 can also discard information once the respective coins have been fully spent, and merchants may discard information once payments from the mint have been received (assuming records are also no longer needed for tax authorities). The mint's bank transfers dealing in traditional currency are expected to be recorded for tax authorities to ensure taxability. \subsection{Withdrawal} To withdraw anonymous digital coins, the customer performs the following interaction with the mint: \begin{enumerate} \item The customer identifies a mint with an auditor-approved coin signing public-private key pair $K := (K_s, K_p)$ and 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 $C_p$, \item blinding factor $b$, \end{itemize} and commits $\langle W, C, b \rangle$ to disk. \item The customer transfers an amount of money corresponding to (at least) $K_p$ to the mint, with $W_p$ in the subject line of the transaction. \item The mint receives the transaction and credits the $W_p$ reserve with the respective amount in its database. \item The customer sends $S_W(E_b(C_p))$ to the mint to request withdrawal of $C$; here, $E_b$ denotes Chaum-style blinding with blinding factor $b$. \item The mint checks if the same withdrawal request was issued before; in this case, it sends $S_{K}(E_b(C_p))$ to the customer.\footnote{Here $S_K$ denotes a Chaum-style blind signature with private key $K_s$.} If this is a fresh withdrawal request, the mint performs the following transaction: \begin{enumerate} \item checks if the reserve $W_p$ has sufficient funds for a coin of value corresponding to $K_p$ \item stores the withdrawal request $\langle S_W(E_b(C_p)), S_K(E_b(C_p)) \rangle$ in its database for future reference, \item deducts the amount corresponding to $K_p$ from the reserve, \item and sends $S_{K}(E_b(C_p))$ to the customer. \end{enumerate} If the guards for the transaction fail, the mint sends a descriptive error back to the customer, with proof that it operated correctly (i.e. by showing the transaction history for the reserve). \item The customer computes (and verifies) the unblind signature $S_K(C_p) = D_b(S_K(E_b(C_p)))$. The customer writes $\langle S_K(C_p), C_s \rangle$ to disk (effectively adding the coin to the local wallet) for future use. \end{enumerate} \subsection{Exact and partial spending} A customer can spend coins at a merchant, under the condition that the merchant trusts the mint that minted the coin. Merchants are identified by their public key $M := (M_s, M_p)$, which must be known to the customer apriori. The following steps describe the protocol between customer, merchant and mint for a transaction involving a coin $C := (C_s, C_p)$ which is previously signed by a mint's denomination key $K$, i.e. the customer posses $\widetilde{C} := S_K(C_p)$: \begin{enumerate} \item\label{contract} Let $\vec{D} := D_1, \ldots, D_n$ be the list of mints accepted by the merchant where each $D_i$ is a mint's public key. The merchant creates a digitally signed contract $\mathcal{A} := S_M(m, f, a, H(p, r), \vec{D})$ where $m$ is an identifier for this transaction, $a$ is data relevant to the contract indicating which services or goods the merchant will deliver to the customer, $f$ is the price of the offer, and $p$ is the merchant's payment information (e.g. his IBAN number) and $r$ is an random nounce. The merchant commits $\langle \mathcal{A} \rangle$ to disk and sends $\mathcal{A}$ it to the customer. \item\label{deposit} The customer must possess or acquire a coin minted by a mint that is accepted by the merchant, i.e. $K$ should be publicly signed by some $D_i \in \{D_1, D_2, \ldots, D_n\}$, and has a value $\geq f$. (The customer can of course also use multiple coins where the total value adds up to the cost of the transaction and run the following steps for each of the coins. However, for simplicity of the description here we will assume that one coin is sufficient.) The customer then generates a \emph{deposit-permission} $\mathcal{D} := S_c(\widetilde{C}, m, f, H(a), H(p,r), M_p)$ and sends $\langle \mathcal{D}, D_i\rangle$ to the merchant, where $D_i$ is the mint which signed $K$. \item The merchant gives $(\mathcal{D}, p, r)$ to the mint, revealing his payment information. \item The mint validates $\mathcal{D}$ and checks for double spending. If the coin has been involved in previous transactions, it sends an error with the records from the previous transactions back to the merchant. If double spending is not found, the mint commits $\langle \mathcal{D} \rangle$ to disk and notifies the merchant that deposit operation was successful. \item The merchant commits and forwards the notification from the mint to the customer, confirming the success or failure of the operation. \end{enumerate} Similarly, if a transaction is aborted after Step~\ref{deposit}, 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 (where $f$ is smaller than the actual value of the coin). To unlink subsequent transactions from a coin, the customer has to execute the coin refreshing protocol with the mint. %\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 $\rightarrow$ mint)}; %\node (C) [def,below=of B]{confirm (or refuse) lock (mint $\rightarrow$ 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 $\rightarrow$ mint)}; %\node (G) [def,below=of F]{transfer confirmation (mint $\rightarrow$ 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 mint in the coin spending % protocol} %\label{fig:spending_protocol_interactions} %\end{figure} \subsection{Refreshing} The following protocol is executed in order to refresh a coin $C'$ of denomination $K$ to a fresh coin $\widetilde{C}$ with the same denomination. In the protocol, $\kappa \ge 3$ is a security parameter and $G$ is the generator of the elliptic curve. \begin{enumerate} \item For each $i = 1,\ldots,\kappa$, the customer \begin{itemize} \item randomly generates transfer key $T^{(i)} := \left(t^{(i)}_s,T^{(i)}_p\right)$ where $T^{(i)}_p := t^{(i)}_s G$, \item randomly generates coin key pair $C^{(i)} := \left(c_s^{(i)}, C_p^{(i)}\right)$ where $C^{(i)}_p := c^{(i)}_s G$, \item randomly generates blinding factors $b_i$, \item computes $E_i := E_{K_i}\left(c_s^{(i)}, b_i\right)$ where $K_i := H(c'_s T_p^{(i)})$. (The encryption key $K_i$ is computed by multiplying the private key $c'_s$ of the original coin with the point on the curve that represents the public key $T^{(i)}_p$ of the transfer key $T^{(i)}$.), \end{itemize} and commits $\langle C', \vec{T}, \vec{C}, \vec{b} \rangle$ to disk. \item The customer computes $B_i := E_{b_i}(C^{(i)}_p)$ for $i=1,\ldots,\kappa$ and sends a commitment $S_{C'}(\vec{E}, \vec{B}, \vec{T_p}))$ to the mint; here $E_{b_i}$ denotes Chaum-style blinding with blinding factor $b_i$. \item The mint generates a random $\gamma$ with $1 \le \gamma \le \kappa$ and marks $C'_p$ as spent by committing $\langle C', \gamma, S_{C'}(\vec{E}, \vec{B}, \vec{T}) \rangle$ to disk. \item The mint sends $S_K(C'_p, \gamma)$ to the customer.\footnote{Instead of $K$, it is also possible to use any equivalent mint signing key known to the customer here, as $K$ merely serves as proof to the customer that the mint selected this particular $\gamma$.} \item The customer commits $\langle C', S_K(C'_p, \gamma) \rangle$ to disk. \item The customer computes $\mathfrak{R} := \left(t_s^{(i)}, C_p^{(i)}, b_i\right)_{i \ne \gamma}$ and sends $S_{C'}(\mathfrak{R})$ to the mint. \item \label{step:refresh-ccheck} The mint checks whether $\mathfrak{R}$ is consistent with the commitments; specifically, it computes for $i \not= \gamma$: \begin{itemize} \item $\overline{K}_i := H(t_s^{(i)} C_p')$, \item $(\overline{c}_s^{(i)}, \overline{b}_i) := D_{\overline{K}_i}(E_i)$, \item $\overline{C}^{(i)}_p := \overline{c}_s^{(i)} G$, \item $\overline{B}_i := E_{b_i}(C_p^{(i)})$, \item $\overline{T}_i := t_s^{(i)} G$, \end{itemize} and checks if $\overline{C}^{(i)}_p = C^{(i)}_p$ and $H(E_i, \overline{B}_i, \overline{T}^{(i)}_p) = H(E_i, B_i, T^{(i)}_p)$ and $\overline{T}_i = T_i$. \item \label{step:refresh-done} If the commitments were consistent, the mint sends the blind signature $\widetilde{C} := S_{K}(B_\gamma)$ to the customer. Otherwise, the mint responds with an error the value of $C'$. \end{enumerate} %\subsection{N-to-M Refreshing} % %TODO: Explain, especially subtleties regarding session key / the spoofing attack that requires signature. \subsection{Linking} % FIXME: explain better... For a coin that was successfully refreshed, the mint responds to a request $S_{C'}(\mathtt{link})$ with $(T^{(\gamma)}_p$, $E_{\gamma}, \widetilde{C})$. This allows the owner of the old coin to also obtain the private key of the new coin, even if the refreshing protocol was illicitly executed by another party who learned $C'_s$ from the old owner. \section{Discussion} \subsection{Offline Payments} Chaum's original proposals for anonymous digital cash avoided the locking and online spending steps detailed in this proposal by providing a means to deanonymize customers involved in double-spending. We believe that this is problematic as the mint or the merchant will then still need out-of-band means to recover funds from the customer, which may be impossible in practice. In contrast, in our design only the mint may try to defraud the other participants and disappear. While this is still a risk, this is likely manageable, especially compared to recovering funds via the court system from customers. \subsection{Bona-fide microdonations} Evidently the customer can ``cheat'' by aborting the transaction in Step 3 of the microdonation protocol if the outcome is unfavourable --- 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. \subsection{Merchant Tax Audits} For a tax audit on the merchant, the mint 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 punished in relation to the amount transferred by the traditional currency transfer. \section{Future Work} %The legal status of the system needs to be investigated in the various %legal systems of the world. However, given that the system enables %taxation and is able to impose withdrawal limits and thus is not %suitable for money laundering, we are optimistic that states will find %the design desirable. We did not yet perform performance measurements for the various operations. However, we are pretty sure that the computational and bandwidth cost for transactions described in this paper is likely small compared to other business costs for the mint. We expect costs within the system to be dominated by the (replicated, transactional) database. However, these expenses are again likely small in relation to the business cost of currency transfers using traditional banking. Here, mint 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 libre implementation and open protocol may finally enable modern society to upgrade to proper electronic wallets with efficient, secure and privacy-preserving transactions. \bibliographystyle{alpha} \bibliography{taler} \appendix \section{Optional features} In this appendix we detail various optional features that can be added to the basic protocol. \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 mechant 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 mint (and the customer). Assuming the mint has a way to recover the funds from the merchant (or simply not performed the transfer yet), the mint 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. The (anonymous) customer -- but nobody else -- can then use the refresh protocol to melt the refunded coin and create a fresh coin that is unlinkable to the previous transaction. \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 mint 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 been spent or is already locked, the mint provides the owner's deposit or locking request and signature to prove the attempted fraud by the customer. Otherwise, the mint 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 mint before the lock permission expires to ensure that no other merchant spends the coin first. \begin{enumerate} \item\label{offer2} The merchant sends an \emph{offer:} $\langle S_M(m, f), \vec{D} \rangle$ containing the price of the offer $f$, a transaction ID $m$ and the list of mints $D_1, \ldots, D_n$ accepted by the merchant where each $D_i$ is a mint's public key. \item\label{lock2} The customer must possess or acquire a coin minted by a mint that is accepted by the merchant, i.e. $K$ should be publicly signed by some $D_i \in \{D_1, D_2, \ldots, D_n\}$, 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 $\langle \mathcal{L}, D_i\rangle$ to the merchant, where $D_i$ is the mint which signed $K$. \item The merchant asks the mint to apply the lock by sending $\langle \mathcal{L} \rangle$ to the mint. \item The mint validates $\widetilde{C}$ and detects double spending if there is a lock-permission record $S_c(\widetilde{C}, t', m', f', M_p')$ where $(t', m', f', M_p') \neq (t, m, f, M_p)$ or a \emph{deposit-permission} record for $C$ and sends it to the merchant, who can then use it prove to the customer and subsequently ask the customer to issue a new lock-permission. If double spending is not found, the mint 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 nounce. The merchant commits $\langle \mathcal{A} \rangle$ to disk and sends it to the customer. \item The customer creates a \emph{deposit-permission} $\mathcal{D} := S_c(\widetilde{C}, f, m, M_p, H(a), H(p, r))$, 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 mint, revealing his payment information. \item The mint verifies $(\mathcal{D}, p, r)$ for its validity. A \emph{deposit-permission} for a coin $C$ is valid if: \begin{itemize} \item $C$ is not refreshed already \item there exists no other \emph{deposit-permission} on disk for \\ $\mathcal{D'} := S_c(\widetilde{C}, f', m', M_p', H(a'), H(p', r'))$ for $C$ such that \\ $(f', m',M_p', H(a')) \neq (f, m, M_p, H(a))$ \item $H(p, r) := H(p', r')$ \end{itemize} If $C$ is valid and no other \emph{deposit-permission} for $C$ exists on disk, the mint does the following: \begin{enumerate} \item if a \emph{lock-permission} exists for $C$, it is deleted from 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 $H(\mathcal{D})$. \item $\langle \mathcal{D}, p, r \rangle$ is commited to disk. \end{enumerate} If the deposit record $\langle \mathcal{D}, p, r \rangle$ already exists, the mint sends it 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 ,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 mint 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 mint. 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 mint is small in relation to $m$. The mint 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 mint. 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 mint. 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 fradulent 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 mint even if the merchant looses the coin flip, such a scheme is unsuitable for microdonations as the transaction costs from involving the mint 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} \end{document}