## CryptoDB

### Michael Backes

#### Publications

Year
Venue
Title
2019
PKC
With the recent emergence of efficient zero-knowledge (ZK) proofs for general circuits, while efficient zero-knowledge proofs of algebraic statements have existed for decades, a natural challenge arose to combine algebraic and non-algebraic statements. Chase et al. (CRYPTO 2016) proposed an interactive ZK proof system for this cross-domain problem. As a use case they show that their system can be used to prove knowledge of a RSA/DSA signature on a message m with respect to a publicly known Pedersen commitment $g^m h^r$. One drawback of their system is that it requires interaction between the prover and the verifier. This is due to the interactive nature of garbled circuits, which are used in their construction. Subsequently, Agrawal et al. (CRYPTO 2018) proposed an efficient non-interactive ZK (NIZK) proof system for cross-domains based on SNARKs, which however require a trusted setup assumption.In this paper, we propose a NIZK proof system for cross-domains that requires no trusted setup and is efficient both for the prover and the verifier. Our system constitutes a combination of Schnorr based ZK proofs and ZK proofs for general circuits by Giacomelli et al. (USENIX 2016). The proof size and the running time of our system are comparable to the approach by Chase et al. Compared to Bulletproofs (SP 2018), a recent NIZK proofs system on committed inputs, our techniques achieve asymptotically better performance on prover and verifier, thus presenting a different trade-off between the proof size and the running time.
2019
EUROCRYPT
Ring signatures allow for creating signatures on behalf of an ad hoc group of signers, hiding the true identity of the signer among the group. A natural goal is to construct a ring signature scheme for which the signature size is short in the number of ring members. Moreover, such a construction should not rely on a trusted setup and be proven secure under falsifiable standard assumptions. Despite many years of research this question is still open.In this paper, we present the first construction of size-optimal ring signatures which do not rely on a trusted setup or the random oracle heuristic. Specifically, our scheme can be instantiated from standard assumptions and the size of signatures grows only logarithmically in the number of ring members.We also extend our techniques to the setting of linkable ring signatures, where signatures created using the same signing key can be linked.
2018
ASIACRYPT
We introduce a new cryptographic primitive called signatures with flexible public key $(\mathsf{SFPK})$. We divide the key space into equivalence classes induced by a relation $\mathcal {R}$. A signer can efficiently change his or her key pair to a different representatives of the same class, but without a trapdoor it is hard to distinguish if two public keys are related. Our primitive is motivated by structure-preserving signatures on equivalence classes ($\mathsf{SPS\text {-}EQ}$), where the partitioning is done on the message space. Therefore, both definitions are complementary and their combination has various applications.We first show how to efficiently construct static group signatures and self-blindable certificates by combining the two primitives. When properly instantiated, the result is a group signature scheme that has a shorter signature size than the current state-of-the-art scheme by Libert, Peters, and Yung from Crypto’15, but is secure in the same setting.In its own right, our primitive has stand-alone applications in the cryptocurrency domain, where it can be seen as a straightforward formalization of so-called stealth addresses. Finally, it can be used to build the first efficient ring signature scheme in the plain model without trusted setup, where signature size depends only sub-linearly on the number of ring members. Thus, we solve an open problem stated by Malavolta and Schröder at ASIACRYPT’2017.
2016
PKC
2011
ASIACRYPT
2008
ASIACRYPT
2008
ASIACRYPT
2007
TCC
2005
TCC
2004
TCC

Crypto 2011
TCC 2010
Eurocrypt 2005
Asiacrypt 2004