Abstract
Multiple-precision multiplication algorithms are of fundamental interest for both theoretical and practical reasons. The conventional method requires 0(n2) bit operations whereas the fastest known multiplication algorithm is of order 0(n log n log log n). The price that has to be paid for the increase in speed is a much more sophisticated theory and programming code. This work presents an extensive study of the best known multiple-precision multiplication algorithms. Different algorithms are implemented in C, their performance is analyzed in detail and compared to each other. The break even points, which are essential for the selection of the fastest algorithm for a particular task, are determined for a given hardware software combination.
Library of Congress Subject Headings
Algorithms; Computer programming
Publication Date
1991
Document Type
Thesis
Department, Program, or Center
Computer Science (GCCIS)
Advisor
Radziszowski, S
Advisor/Committee Member
Anderson, P
Advisor/Committee Member
Kitchen, A
Recommended Citation
Benz, Sonja, "Fast multiplication of multiple-precision integers" (1991). Thesis. Rochester Institute of Technology. Accessed from
https://repository.rit.edu/theses/647
Campus
RIT – Main Campus
Comments
Note: imported from RIT’s Digital Media Library running on DSpace to RIT Scholar Works. Physical copy available through RIT's The Wallace Library at: QA76.6 .B46 1991