A Black-Box Approach to Post-Quantum Zero-Knowledge in Constant Rounds

TL;DR

This paper introduces new constant-round zero-knowledge protocols secure against quantum attacks, using black-box simulation and weaker assumptions, advancing post-quantum cryptography.

Contribution

It constructs protocols satisfying statistical and computational soundness with black-box epsilon-zero-knowledge under weaker assumptions than prior work.

Findings

Achieved statistical soundness with collapsing hash functions.

Constructed computational soundness protocols based on post-quantum one-way functions.

Developed a novel quantum rewinding technique for simulation and extraction.

Abstract

In a recent seminal work, Bitansky and Shmueli (STOC '20) gave the first construction of a constant round zero-knowledge argument for NP secure against quantum attacks. However, their construction has several drawbacks compared to the classical counterparts. Specifically, their construction only achieves computational soundness, requires strong assumptions of quantum hardness of learning with errors (QLWE assumption) and the existence of quantum fully homomorphic encryption (QFHE), and relies on non-black-box simulation. In this paper, we resolve these issues at the cost of weakening the notion of zero-knowledge to what is called $\epsilon$-zero-knowledge. Concretely, we construct the following protocols: - We construct a constant round interactive proof for NP that satisfies statistical soundness and black-box $\epsilon$-zero-knowledge against quantum attacks assuming the existence of collapsing hash functions, which is a quantum counterpart of collision-resistant hash functions. Interestingly, this construction is just an adapted version of the classical protocol by Goldreich and Kahan (JoC '96) though the proof of $\epsilon$-zero-knowledge property against quantum adversaries requires novel ideas. - We construct a constant round interactive argument for NP that satisfies computational soundness and black-box $\epsilon$-zero-knowledge against quantum attacks only assuming the existence of post-quantum one-way functions. At the heart of our results is a new quantum rewinding technique that enables a simulator to extract a committed message of a malicious verifier while simulating verifier's internal state in an appropriate sense.