Sum of squares of degrees in a graph

Abstract

Let (v,e) be the set of all simple graphs with v vertices and e edges and let P2(G)=Σ di2 denote the sum of the squares of the degrees, d1, >..., dv, of the vertices of G. It is known that the maximum value of P2(G) for G ∈ (v,e) occurs at one or both of two special graphs in (v,e)--the graph or the graph. For each pair (v,e), we determine which of these two graphs has the larger value of P2(G). We also determine all pairs (v,e) for which the values of P2(G) are the same for the and the graph. In addition to the and graphs, we find all other graphs in (v,e) for which the maximum value of P2(G) is attained. Density questions posed by previous authors are examined.