Efficient construction of broadcast graphs

Abstract

A broadcast graph is a connected graph, G=(V,E), |V |=n, in which each vertex can complete broadcasting of one message within at most t= n time units. A minimum broadcast graph on n vertices is a broadcast graph with the minimum number of edges over all broadcast graphs on n vertices. The cardinality of the edge set of such a graph is denoted by B(n). In this paper we construct a new broadcast graph with B(n) (k+1)N -(t-k2+2)2k+t-k+2, for n=N=(2k-1)2t+1-k and B(n) (k+1-p)n -(t-k2+p+2)2k+t-k -(p-2)2p, for 2t < n<(2k-1)2t+1-k, where t ≥ 7, 2 k t/2 -1 for even n and 2 k t/2 -1 for odd n, d=N-n, x= d2t+1-k and p = 2(x+1) if x>0 and p=0 if x=0. The new bound is an improvement upon the bound presented by Harutyunyan and Liestman (2012) for odd values of n.