Maximum first Zagreb index of orientations of unicyclic graphs with given matching number
Abstract
Let D=(V,A) be a digraphs without isolated vertices. The first Zagreb index of a digraph D defined as a summation over all arcs, M1(D)=12Σuv∈ A(d+u+d-v), where d+u(resp. d-u) denotes the out-degree (resp. in-degree) of the vertex u. In this paper, we give the maximal values and maximal digraphs of first Zagreb index over the set of all orientations of unicyclic graphs with n vertices and matching number m (2≤ m≤ n2).
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