Frobenius Additive Fast Fourier Transform

Li, Wen-Ding; Chen, Ming-Syan; Kuo, Po-Chun; Cheng, Chen-Mou; Yang, Bo‐Yin

doi:10.1145/3208976.3208998

Cited by 4 publications

(1 citation statement)

References 19 publications

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“…To avoid confusion, we refer to such algorithms as multiplicative FFTs hereafter. Additive FFTs have been investigated as an alternative to multiplicative FFTs for use in fast multiplication algorithms for binary polynomials [28,6,23,8,9,18], and have also found applications in coding theory and cryptography [4,3,10,1].…”

Section: Introductionmentioning

confidence: 99%

Fast Hermite interpolation and evaluation over finite fields of characteristic two

Coxon

2020

Journal of Symbolic Computation

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An additive fast Fourier transform over a finite field of characteristic two efficiently evaluates polynomials at every element of an F 2 -linear subspace of the field. We view these transforms as performing a change of basis from the monomial basis to the associated Lagrange basis, and consider the problem of performing the various conversions between these two bases, the associated Newton basis, and the "novel" basis of Lin, Chung and Han (FOCS 2014). Existing algorithms are divided between two families, those designed for arbitrary subspaces and more efficient algorithms designed for specially constructed subspaces of fields with degree equal to a power of two. We generalise techniques from both families to provide new conversion algorithms that may be applied to arbitrary subspaces, but which benefit equally from the specially constructed subspaces. We then construct subspaces of fields with smooth degree for which our algorithms provide better performance than existing algorithms.

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Section: Introductionmentioning

confidence: 99%

Fast Hermite interpolation and evaluation over finite fields of characteristic two

Coxon

2020

Journal of Symbolic Computation

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Uni/multi variate polynomial embeddings for zkSNARKs

Gong

2024

Cryptogr. Commun.

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A zero-knowledge proof is a cryptographic primitive that enables a prover to convince a verifier the validity of a mathematical statement (an NP statement) without revealing any secret inputs to the verifier. A special case, called zero-knowledge Succinct Non-interactive ARgument of Knowledge (zkSNARK) is particularly designed for arithmetic circuit proof systems which have important applications in blockchain privacy. The major computations in this type of zkSNARK proofs with post-quantum security are polynomial evaluations and Lagrange interpolations over finite fields. Given a sequence over a finite field, in the field of coding and sequences research, we understand that there are two representations of the sequence, one is a univariate polynomial and the other, a multivariate polynomial. This is exactly what is done in those zero-knowledge proof systems to transform the proof of a R1CS relation to evaluate uni/multi variate polynomials at some random points in the finite field. In this paper, we present a comparative analysis on how to convert a rank 1 constrained satisfiability (R1CS) system (more general than a circuit system) into a polynomial equality and provide analysis on the concrete complexities of provers, proof sizes and verifiers. We use two concrete zkSNARK schemes, i.e., Polaris, univariate polynomial encodings and Spartan, multivariate polynomial encodings, as examples to show our analysis. Secondly, we propose to select interpolating sets as subfields instead of affine spaces of a large field for Lagrange interpolation. This new method has improved the performance of R1CS encodings largely. We comment that post-quantum secure zkSNARKs yield post-quantum digital signatures with security only depending on symmetric-key schemes. Some open problems are proposed at the end of the paper.

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The Discrete Fourier Transform Over the Binary Finite Field

Fedorenko¹

2023

IEEE Access

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Frobenius Additive Fast Fourier Transform

Cited by 4 publications

References 19 publications

Fast Hermite interpolation and evaluation over finite fields of characteristic two

Fast Hermite interpolation and evaluation over finite fields of characteristic two

Uni/multi variate polynomial embeddings for zkSNARKs

The Discrete Fourier Transform Over the Binary Finite Field

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