Abstract
Using computer algorithms we show that in any 2-(22,8,4) design there are no blocks of type 3, thus leaving as possible only types 1 and 2. Blocks of type 3, i.e. those which intersect two others in one point, are eliminated using the algorithms described in our previous paper. It was perhaps the second largest computation ever performed (after the solution to the RSA129 challenge), requiring more than a century of cpu time.
Publication Date
1999
Document Type
Article
Department, Program, or Center
Center for Advancing the Study of CyberInfrastructure
Recommended Citation
The Journal of Combinatorial Mathematics and Combinatorial Computing 30 (1999) 251-253
Campus
RIT – Main Campus
COinS
Comments
ISSN:0835-3026 Note: imported from RIT’s Digital Media Library running on DSpace to RIT Scholar Works in February 2014.