IACR News item: 27 November 2023
Carmit Hazay, Muthuramakrishnan Venkitasubramaniam, Mor Weiss
ePrint Report
In their seminal work, Ishai, Kushilevitz, Ostrovsky, and Sahai (STOC`07) presented the MPC-in-the-Head paradigm, which shows how to design Zero-Knowledge Proofs (ZKPs) from secure Multi-Party Computation (MPC) protocols. This paradigm has since then revolutionized and modularized the design of efficient ZKP systems, with far-reaching applications beyond ZKPs. However, to the best of our knowledge, all previous instantiations relied on fully-secure MPC protocols, and have not been able to leverage the fact that the paradigm only imposes relatively weak privacy and correctness requirements on the underlying MPC.
In this work, we extend the MPC-in-the-Head paradigm to game-based cryptographic primitives supporting homomorphic computations (e.g., fully-homomorphic encryption, functional encryption, randomized encodings, homomorphic secret sharing, and more). Specifically, we present a simple yet generic compiler from these primitives to ZKPs which use the underlying primitive as a black box. We also generalize our paradigm to capture commit-and-prove protocols, and use it to devise tight black-box compilers from Interactive (Oracle) Proofs to ZKPs, assuming One-Way Functions (OWFs).
We use our paradigm to obtain several new ZKP constructions:
1. The first ZKPs for NP relations $\mathcal{R}$ computable in (polynomial-time uniform) $NC^1$, whose round complexity is bounded by a fixed constant (independent of the depth of $\mathcal{R}$'s verification circuit), with communication approaching witness length (specifically, $n\cdot poly\left(\kappa\right)$, where $n$ is the witness length, and $\kappa$ is a security parameter), assuming DCR. Alternatively, if we allow the round complexity to scale with the depth of the verification circuit, our ZKPs can make black-box use of OWFs.
2. Constant-round ZKPs for NP relations computable in bounded polynomial space, with $O\left(n\right)+o\left(m\right)\cdot poly\left(\kappa\right)$ communication assuming OWFs, where $m$ is the instance length. This gives a black-box alternative to a recent non-black-box construction of Nassar and Rothblum (CRYPTO`22).
3. ZKPs for NP relations computable by a logspace-uniform family of depth-$d\left(m\right)$ circuits, with $n\cdot poly\left(\kappa,d\left(m\right)\right)$ communication assuming OWFs. This gives a black-box alternative to a result of Goldwasser, Kalai and Rothblum (JACM).
In this work, we extend the MPC-in-the-Head paradigm to game-based cryptographic primitives supporting homomorphic computations (e.g., fully-homomorphic encryption, functional encryption, randomized encodings, homomorphic secret sharing, and more). Specifically, we present a simple yet generic compiler from these primitives to ZKPs which use the underlying primitive as a black box. We also generalize our paradigm to capture commit-and-prove protocols, and use it to devise tight black-box compilers from Interactive (Oracle) Proofs to ZKPs, assuming One-Way Functions (OWFs).
We use our paradigm to obtain several new ZKP constructions:
1. The first ZKPs for NP relations $\mathcal{R}$ computable in (polynomial-time uniform) $NC^1$, whose round complexity is bounded by a fixed constant (independent of the depth of $\mathcal{R}$'s verification circuit), with communication approaching witness length (specifically, $n\cdot poly\left(\kappa\right)$, where $n$ is the witness length, and $\kappa$ is a security parameter), assuming DCR. Alternatively, if we allow the round complexity to scale with the depth of the verification circuit, our ZKPs can make black-box use of OWFs.
2. Constant-round ZKPs for NP relations computable in bounded polynomial space, with $O\left(n\right)+o\left(m\right)\cdot poly\left(\kappa\right)$ communication assuming OWFs, where $m$ is the instance length. This gives a black-box alternative to a recent non-black-box construction of Nassar and Rothblum (CRYPTO`22).
3. ZKPs for NP relations computable by a logspace-uniform family of depth-$d\left(m\right)$ circuits, with $n\cdot poly\left(\kappa,d\left(m\right)\right)$ communication assuming OWFs. This gives a black-box alternative to a result of Goldwasser, Kalai and Rothblum (JACM).
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