Title :
Extremal Functions on Cayley Digraphs of Finite Cyclic Groups
Author :
Blocher, J.F. ; Hampton, S.M. ; Linden, C.E.
Author_Institution :
Dept. of Math., Univ. of Nevada-Reno, Reno, NV, USA
Abstract :
For positive integers d and k we define m(d, k) to be the maximum positive integer m such that the Cayley digraph of the finite cyclic group of order m, generated by a set of k positive integers has diameter less than or equal to d. In this paper we establish a new lower bound for m(2, k). We also use this lower bound to obtain a lower bound for m(d, k) for any given positive integer d and sufficiently large k.
Keywords :
directed graphs; group theory; Cayley digraphs; extremal functions; finite cyclic groups; positive integers; Combinatorial mathematics; Educational institutions; Multiprocessor interconnection; Optimization; USA Councils; Upper bound; combinatorial mathematics; graph theory; networks; optimization;
Conference_Titel :
Pervasive Systems, Algorithms and Networks (ISPAN), 2012 12th International Symposium on
Conference_Location :
San Marcos, TX
Print_ISBN :
978-1-4673-5064-8
DOI :
10.1109/I-SPAN.2012.14
