Polynomial Multiplication over Finite Fields in Time O(n logn)

David Harvey; Joris Van Der Hoeven

doi:10.1145/3505584

Polynomial Multiplication over Finite Fields in Time O(n logn)

David Harvey
, Joris Van Der Hoeven

University of New South Wales

Research output: Contribution to journal › Article › peer-review

Abstract

Assuming a widely believed hypothesis concerning the least prime in an arithmetic progression, we show that polynomials of degree less than n over a finite field Fq with q elements can be multiplied in time O(n logq log(n logq)), uniformly in q. Under the same hypothesis, we show how to multiply two n-bit integers in time O(n logn); this algorithm is somewhat simpler than the unconditional algorithm from the companion paper [22]. Our results hold in the Turing machine model with a finite number of tapes.

Original language	English
Article number	12
Journal	Journal of the ACM
Volume	69
Issue number	2
DOIs	https://doi.org/10.1145/3505584
Publication status	Published - 1 Apr 2022

Keywords

FFT
Polynomial multiplication
algorithm
complexity bound
finite field
integer multiplication

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10.1145/3505584

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title = "Polynomial Multiplication over Finite Fields in Time O(n logn)",

abstract = "Assuming a widely believed hypothesis concerning the least prime in an arithmetic progression, we show that polynomials of degree less than n over a finite field Fq with q elements can be multiplied in time O(n logq log(n logq)), uniformly in q. Under the same hypothesis, we show how to multiply two n-bit integers in time O(n logn); this algorithm is somewhat simpler than the unconditional algorithm from the companion paper [22]. Our results hold in the Turing machine model with a finite number of tapes.",

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N2 - Assuming a widely believed hypothesis concerning the least prime in an arithmetic progression, we show that polynomials of degree less than n over a finite field Fq with q elements can be multiplied in time O(n logq log(n logq)), uniformly in q. Under the same hypothesis, we show how to multiply two n-bit integers in time O(n logn); this algorithm is somewhat simpler than the unconditional algorithm from the companion paper [22]. Our results hold in the Turing machine model with a finite number of tapes.

AB - Assuming a widely believed hypothesis concerning the least prime in an arithmetic progression, we show that polynomials of degree less than n over a finite field Fq with q elements can be multiplied in time O(n logq log(n logq)), uniformly in q. Under the same hypothesis, we show how to multiply two n-bit integers in time O(n logn); this algorithm is somewhat simpler than the unconditional algorithm from the companion paper [22]. Our results hold in the Turing machine model with a finite number of tapes.

KW - FFT

KW - Polynomial multiplication

KW - algorithm

KW - complexity bound

KW - finite field

KW - integer multiplication

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Polynomial Multiplication over Finite Fields in Time O(n logn)

Abstract

Keywords

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