Extremal graphs for vertex-degree-based invariants with given degree sequences

Abstract

For a symmetric bivariable function f(x,y), let the connectivity function of a connected graph G be Mf(G)=Σuv∈ E(G)f(d(u),d(v)), where d(u) is the degree of vertex u. In this paper, we prove that for an escalating (de-escalating) function f(x,y), there exists a BFS-graph with the maximum (minimum) connectivity function Mf(G) among all graphs with a c-cyclic degree sequence π=(d1,d2, …, dn) and dn=1, and obtain the majorization theorem for connectivity function for unicyclic and bicyclic degree sequences. Moreover, some applications of graph invariants based on degree are included.