CryptoDB
Pairing-Based Batch Arguments for NP with a Linear-Size CRS
| Authors: |
|
|---|---|
| Download: | |
| Conference: | ASIACRYPT 2025 |
| Abstract: | Non-interactive batch arguments (BARGs) for $\mathsf{NP}$ allow a prover to prove $\ell$ $\mathsf{NP}$ statements with a proof whose size scales sublinearly with $\ell$. In this work, we construct a pairing-based BARG where the size of the common reference string (CRS) scales linearly with the number of instances and the prover's computational overhead is quasi-linear in the number of instances. Our construction is fully black box in the use of the group. Security relies on a $q$-type assumption in composite-order pairing groups. The best black-box pairing-based BARG prior to this work has a nearly-linear size CRS (i.e., a CRS of size $\ell^{1 + o(1)}$) and the prover overhead is quadratic in the number of instances. All previous pairing-based BARGs with a sublinear-size CRS relied on some type of recursive composition and correspondingly, non-black-box use of the group. The main technical insight underlying our construction is to substitute the vector commitment in previous pairing-based BARGs with a polynomial commitment. This yields a scheme that does not rely on cross terms in the common reference string. In previous black-box pairing-based schemes, the super-linear-size CRS and quadratic prover complexity was due to the need for cross terms. |
BibTeX
@inproceedings{asiacrypt-2025-35899,
title={Pairing-Based Batch Arguments for NP with a Linear-Size CRS},
publisher={Springer-Verlag},
author={Binyi Chen and Noel Elias and David J. Wu},
year=2025
}