On Multiplication In Finite Fields
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Date
2010
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Academic Press inc Elsevier Science
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Abstract
We present a method for multiplication in finite fields which gives multiplication algorithms with improved or best known bilinear complexities for certain finite fields. Our method generalizes some earlier methods and combines them with the recently introduced complexity notion (M) over cap (q)(l), which denotes the minimum number of multiplications needed in F-q in order to obtain the coefficients of the product of two arbitrary l-term polynomials modulo x(l) in F-q[x]. We study our method for the finite fields F(q)n, where 2 <= n <= 18 and q = 2, 3,4 and we improve or reach the currently best known bilinear complexities. We also give some applications in cryptography. (C) 2010 Published by Elsevier Inc.
Description
Ozbudak, Ferruh/0000-0002-1694-9283; Cenk, Murat/0000-0003-4941-8734
Keywords
Finite Fields, Algebraic Function Fields, Bilinear Complexity
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Citation
Cenk, Murat; Ozbudak, Ferruh,"On multiplication in finite fields", Journal of Complexıty, Vol. 26, No. 2, pp. 172-186, (2010)
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Volume
26
Issue
2
Start Page
172
End Page
186