论文信息 - Connectivity of large bipartite digraphs and graphs

Connectivity of large bipartite digraphs and graphs

Abstract This paper studies the relation between the connectivity and other parameters of a bipartite (di)graph G. Namely, its order n, minimum degree δ, maximum degree Δ, diameter D, and a new parameter l related to the number of short paths in G. (When G is a bipartite — undirected — graph this parameter turns out to be l = (g − 2)/2 , where g stands for its girth.) Let n(Δ, l )  1 + Δ + Δ 2 + ··· + Δ l . As a main result, it is shown that if n > (δ − 1){n(Δ, l ) + n(Δ, D  l  1)  2} + 2 , then the connectivity of the bipartite digraph G is maximum. Similarly, if n > (δ − 1){n(Δ, − l ) + n(Δ, D − l − 2)} , then the arc-connectivity of G is also maximum. Some examples show that these results are best possible. Furthermore, we show that analogous results, formulated in terms of the girth, can be given for the undirected case.

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