Paper 2019/977

Non-malleable Zero-Knowledge Arguments with Lower Round Complexity

Zhenbin Yan and Yi Deng

Abstract

Round complexity is one of the fundamental problems in zero-knowledge proof systems. Non-malleable zero-knowledge (NMZK) protocols are zero-knowledge protocols that provide security even when man-in-the-middle adversaries interact with a prover and a verifier simultaneously. It is known that constant-round public-coin NMZK Arguments for NP can be constructed by assuming the existence of collision-resistant hash functions (Pass and Rosen STOC'05) and the four-round private-coin NMZK Arguments for NP can be constructed in the plain model by assuming the existence of one-way functions (Goyal, Richelson, Rosen and Vald FOCS'14 and Ciampi, Ostrovsky, Siniscalchi and Visconti TCC'17). In this paper, we present a six-round public-coin NMZK argument of knowledge system assuming the existence of collision-resistant hash functions and a three-round private-coin NMZK argument system from multi-collision resistance of hash functions assumption in the keyless setting.