An algebraic characterization of strong graphs

Abstract

Let G be a connected simple graph on n vertices and m edges. Denote Ni(j)(G) the number of spanning subgraphs of G having precisely i edges and not more than j connected components. The graph G is strong if Nij(G)≥ Nij(H) for each pair of integers i∈ \0,1,…,m\ and j∈ \1,2,…,n\ and each connected simple graph H on n vertices and m edges. The graph G is Whitney-maximum if for each connected simple graph H on n vertices and m edges there exists a polynomial PH(x,y) with nonnegative coefficients such that WG(x,y)-WH(x,y)=(1-xy)PH(x,y), where WG and WH stand for the Whitney polynomial of G and H. In this work it is proved that a graph is strong if and only if it is Whitney-maximum. Consequently, the 0-element conjecture proposed by Boesch [J.\ Graph Theory 10 (1986), 339--352] is true when restricted to graph classes in which Whitney-maximum graphs exist.

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