Title :
Montgomery Reduction Algorithm for Modular Multiplication Using Low-Weight Polynomial Form Integers
Author :
Chung, Jaewook ; Hasan, M. Anwar
Author_Institution :
Univ. of Waterloo, Waterloo
Abstract :
In this paper, we extend a recent piece of work on low-weight polynomial form integers (LWPFIs). We present a new coefficient reduction algorithm based on the Montgomery reduction algorithm and provide its detailed analysis results. We give a condition for eliminating the final subtractions at the end of our Montgomery reduction algorithm adapted to perform the coefficient reduction. Our experimental results show that a new coefficient reduction algorithm is indeed more efficient than the one presented in [1].
Keywords :
polynomials; Montgomery reduction algorithm; coefficient reduction algorithm; low-weight polynomial form integers; modular multiplication; Algorithm design and analysis; Arithmetic; Councils; Polynomials; Scholarships; Table lookup; Low-weight polynomial form integers; Montgomery reduction algorithm; More generalized Mersenne numbers; adapted; modular number system; polynomial modular number; system;
Conference_Titel :
Computer Arithmetic, 2007. ARITH '07. 18th IEEE Symposium on
Conference_Location :
Montepellier
Print_ISBN :
0-7695-2854-6
DOI :
10.1109/ARITH.2007.23
