Non-Trivial Zero-Knowledge Implies One-Way Functions

Abstract

A recent breakthrough [Hirahara and Nanashima, STOC'2024] established that if NP ⊂eq ioP/poly, the existence of zero-knowledge with negligible errors for NP implies the existence of one-way functions (OWFs). In this work, we obtain a characterization of one-way functions from the worst-case complexity of zero-knowledge in the high-error regime. We say that a zero-knowledge argument is non-trivial if the sum of its completeness, soundness and zero-knowledge errors is bounded away from 1. Our results are as follows, assuming NP ⊂eq ioP/poly: 1. Non-trivial Non-Interactive ZK (NIZK) arguments for NP imply the existence of OWFs. Using known amplification techniques, this result also provides an unconditional transformation from weak to standard NIZK proofs for all meaningful error parameters. 2. We also generalize to the interactive setting: Non-trivial constant-round public-coin zero-knowledge arguments for NP imply the existence of OWFs, and therefore also (standard) four-message zero-knowledge arguments for NP. Prior to this work, one-way functions could be obtained from NIZKs that had constant zero-knowledge error εzk and soundness error εs satisfying εzk + εs < 1 [Chakraborty, Hulett and Khurana, CRYPTO'2025]. However, the regime where εzk + εs ≥ 1 remained open. This work closes the gap, and obtains new implications in the interactive setting. Our results and techniques could be useful stepping stones in the quest to construct one-way functions from worst-case hardness.