Title :
Arithmetic Operations in Finite Fields of Medium Prime Characteristic Using the Lagrange Representation
Author :
Bajard, Jean-Claude ; Imbert, Laurent ; Nègre, Christophe
Author_Institution :
LIRMM, Montpellier
Abstract :
In this paper, we propose a complete set of algorithms for the arithmetic operations in finite fields of prime medium characteristic. The elements of the fields IFpk are represented using the newly defined Lagrange representation, where polynomials are expressed using their values at sufficiently many points. Our multiplication algorithm, which uses a Montgomery approach, can be implemented in O(k) multiplications and O(k2 log k) additions in the base field IFp. For the inversion, we propose a variant of the extended Euclidean GCD algorithm, where the inputs are given in the Lagrange representation. The Lagrange representation scheme and the arithmetic algorithms presented in the present work represent an interesting alternative for elliptic curve cryptography
Keywords :
computational complexity; cryptography; number theory; polynomials; Euclidean GCD algorithm; Lagrange representation; Montgomery approach; arithmetic operation; elliptic curve cryptography; finite field; multiplication algorithm; Acceleration; Arithmetic; Elliptic curve cryptography; Elliptic curves; Galois fields; Interpolation; Lagrangian functions; Polynomials; Robustness; Security; Euclidean algorithm; Finite field arithmetic; Newton interpolation; elliptic curve cryptography.; optimal extension fields;
Journal_Title :
Computers, IEEE Transactions on
DOI :
10.1109/TC.2006.136
