On the vertex-degree based invariants of digraphs

Abstract

Let D=(V,A) be a digraphs without isolated vertices. A vertex-degree based invariant I(D) related to a real function of D is defined as a summation over all arcs, I(D) = 12Σuv∈ A(du+,dv-), where du+ (resp. du-) denotes the out-degree (resp. in-degree) of a vertex u. In this paper, we give the extremal values and extremal digraphs of I(D) over all digraphs with n non-isolated vertices. Applying these results, we obtain the extremal values of some vertex-degree based topological indices of digraphs, such as the Randi\'c index, the Zagreb index, the sum-connectivity index, the GA index, the ABC index and the harmonic index, and the corresponding extremal digraphs.