Paper 2025/2030

Succinct Zero-knowledge Proofs from One-way Functions:The Blackbox Way

Eden Florentz- Konopnicki, Technion – Israel Institute of Technology
Ron D. Rothblum, Succinct
Abstract

Zero-knowledge proofs allow to encode a computation so that it can be verified without revealing any additional information beyond its correctness. In this work we focus on proofs that are statistically sound meaning that even an unbounded prover cannot make the verifier accept a false statement, except with negligible probability, and computationally zero-knowledge. The seminal result of Goldreich, Micali and Wigderson (CRYPTO 1986) shows that, assuming the existence of a one-way function, such zero-knowledge proofs exist for all languages in NP. Some of the early protocols, such as that of GMW, have a large polynomial overhead in communication compared to the original NP witness. A line of works has shown that in many cases this communication overhead can be avoided. Most recently, Athamnah et al. (TCC 2024) constructed zero-knowledge proofs for all bounded-depth NP relations, where the communication complexity is only larger by an additive factor than the original NP witness. The main caveat of their result is that the protocol makes a non-blackbox use of the one-way function. In this work we show that such succinct zero-knowledge proofs exist for the same class of NP relations, where the protocol makes only a blackbox use of a one-way function. Our protocol achieves a negligible soundness error, in contrast to recent works which can achieve, at best, an inverse polynomial error.

Metadata
Available format(s)
PDF
Category
Cryptographic protocols
Publication info
Preprint.
Contact author(s)
eden konop @ gmail com
rothblum @ gmail com
History
2026-02-21: revised
2025-11-01: received
See all versions
Short URL
https://ia.cr/2025/2030
License
Creative Commons Attribution
CC BY

BibTeX

@misc{cryptoeprint:2025/2030,
      author = {Eden Florentz- Konopnicki and Ron D. Rothblum},
      title = {Succinct Zero-knowledge Proofs from One-way Functions:The Blackbox Way},
      howpublished = {Cryptology {ePrint} Archive, Paper 2025/2030},
      year = {2025},
      url = {https://eprint.iacr.org/2025/2030}
}
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