IACR News item: 05 March 2025
Chaya Ganesh, Sikhar Patranabis, Nitin Singh
ePrint Report
We study linear-time prover SNARKs and make the following contributions:
We provide a framework for transforming a univariate polynomial commitment scheme into a multilinear polynomial commitment scheme. Our transformation is generic, can be instantiated with any univariate scheme and improves on prior transformations like Gemini (EUROCRYPT 2022) and Virgo (S&P 2020) in all relevant parameters: proof size, verification complexity, and prover complexity. Instantiating the above framework with the KZG univariate polynomial commitment scheme, we get SamaritanPCS – the first multilinear polynomial commitment scheme with constant proof size and linear-time prover. SamaritanPCS is a drop-in replacement for the popular PST scheme, and improves upon PST in all relevant parameters.
We construct LogSpartan – a new multilinear PIOP for R1CS based on recent techniques for lookup arguments. Compiling this PIOP using SamaritanPCS gives Samaritan – a SNARK in the universal and updatable SRS setting. Samaritan has linear-time prover, logarithmic verification and logarithmic proof size. Concretely, its proof size is one of the smallest among other known linear-time prover SNARKs without relying on concretely expensive proof recursion techniques. For an R1CS instance with 1 million constraints, Samaritan (over BLS12-381 curve) has a proof size of 6.7KB.
We compare Samaritan with other linear-time prover SNARKs in the updatable setting. We asymptotically improve on the $\log^2 n$ proof size of Spartan. Unlike Libra (CRYPTO 2019), the argument size of Samaritan is independent of the circuit depth. Compared to Gemini (EUROCRYPT 2022), Samaritan achieves 3$\times$ smaller argument size at 1 million constraints. We match the argument size of HyperPlonk, which is the smallest linear-time SNARK for the Plonkish constraint system, while achieving slightly better verification complexity.
We believe that our transformation and our techniques for applying lookups based on logarithmic derivatives to the multilinear setting are of wider interest.
We provide a framework for transforming a univariate polynomial commitment scheme into a multilinear polynomial commitment scheme. Our transformation is generic, can be instantiated with any univariate scheme and improves on prior transformations like Gemini (EUROCRYPT 2022) and Virgo (S&P 2020) in all relevant parameters: proof size, verification complexity, and prover complexity. Instantiating the above framework with the KZG univariate polynomial commitment scheme, we get SamaritanPCS – the first multilinear polynomial commitment scheme with constant proof size and linear-time prover. SamaritanPCS is a drop-in replacement for the popular PST scheme, and improves upon PST in all relevant parameters.
We construct LogSpartan – a new multilinear PIOP for R1CS based on recent techniques for lookup arguments. Compiling this PIOP using SamaritanPCS gives Samaritan – a SNARK in the universal and updatable SRS setting. Samaritan has linear-time prover, logarithmic verification and logarithmic proof size. Concretely, its proof size is one of the smallest among other known linear-time prover SNARKs without relying on concretely expensive proof recursion techniques. For an R1CS instance with 1 million constraints, Samaritan (over BLS12-381 curve) has a proof size of 6.7KB.
We compare Samaritan with other linear-time prover SNARKs in the updatable setting. We asymptotically improve on the $\log^2 n$ proof size of Spartan. Unlike Libra (CRYPTO 2019), the argument size of Samaritan is independent of the circuit depth. Compared to Gemini (EUROCRYPT 2022), Samaritan achieves 3$\times$ smaller argument size at 1 million constraints. We match the argument size of HyperPlonk, which is the smallest linear-time SNARK for the Plonkish constraint system, while achieving slightly better verification complexity.
We believe that our transformation and our techniques for applying lookups based on logarithmic derivatives to the multilinear setting are of wider interest.
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