Title :
Dense symmetric networks from linear groups
Author :
Campbell, L. ; Fellows, M. ; Carlsson, G. ; Faber, V. ; Moore, J. ; Langston, M. ; Mullhaupt, A. ; Sexton, H.
Author_Institution :
Dept. of Comput. Sci., Idaho Univ., ID, USA
Abstract :
An algebraic approach to the problem of constructing large networks of bounded degree and diameter is described. Evidence is provided showing that the table of largest known constructions for small values of the two parameters can be improved almost everywhere by methods based on finite groups. In many entries, the constructions are dramatically larger than the best previously known and many of these improvements are in the range of numbers of processors currently being considered for large parallel processing systems. These contributions, all highly symmetric, can be viewed as belonging to a family of constructions based on vector spaces and their automorphism groups that includes hypercubes and cube-connected cycles as special cases
Keywords :
graph theory; group theory; multiprocessor interconnection networks; Cayley graph; algebraic approach; automorphism groups; bounded degree; cube-connected cycles; finite groups; hypercubes; large networks; linear groups; parallel processing systems; vector spaces; Computer networks; Computer science; Concurrent computing; Cryptography; Hypercubes; Laboratories; Mathematics; Parallel processing; Processor scheduling; Routing;
Conference_Titel :
Frontiers of Massively Parallel Computation, 1988. Proceedings., 2nd Symposium on the Frontiers of
Conference_Location :
Fairfax, VA
Print_ISBN :
0-8186-5892-4
DOI :
10.1109/FMPC.1988.47400
