Improved Area-Time Tradeoffs for Field Multiplication Using Optimal Normal Bases

Author

Adikari, J. ; Barsoum, A. ; Hasan, M.A. ; Namin, A.H. ; Negre, C.

Author_Institution

ECE Dept., Univ. of Waterloo, Waterloo, ON, Canada

Volume

62

Issue

1

fYear

2013

fDate

Jan. 2013

Firstpage

193

Lastpage

199

Abstract

In this paper, we propose new schemes for subquadratic arithmetic complexity multiplication in binary fields using optimal normal bases. The schemes are based on a recently proposed method known as block recombination, which efficiently computes the sum of two products of Toeplitz matrices and vectors. Specifically, here we take advantage of some structural properties of the matrices and vectors involved in the formulation of field multiplication using optimal normal bases. This yields new space and time complexity results for corresponding bit parallel multipliers.

Keywords

Toeplitz matrices; computational complexity; digital arithmetic; Toeplitz matrices; Toeplitz vectors; area-time tradeoffs; bit parallel multipliers; block recombination; field multiplication; optimal normal bases; space complexity; subquadratic arithmetic complexity multiplication; time complexity; Complexity theory; Computer architecture; Delay; Logic gates; Matrix decomposition; Polynomials; Symmetric matrices; Binary field; Toeplitz matrix; block recombination; optimal normal basis;

fLanguage

English

Journal_Title

Computers, IEEE Transactions on

Publisher

ieee

ISSN

0018-9340

Type

jour

DOI

10.1109/TC.2011.198

Filename

6035688