On the eccentric distance sum of unicyclic graphs with a given matching number
Abstract
Let G = (VG,EG) be a simple connected graph. The eccentric distance sum of G is defined as d(G)=Σv ∈ VG\,G(v)DG(v), where G(v) is the eccentricity of the vertex v and DG(v)=Σu ∈ VG\,d(u,v) is the sum of all distances from the vertex v. In this paper, we characterize n-vertex unicyclic graphs with given matching number having the minimal and second minimal eccentric distance sums, respectively.
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