Maximum Spread of Vertex Degrees in a Simple Graph

Abstract

We consider the following problem: let n>k be natural numbers, and let G be a graph on n vertices (undirected, without loops or multiple edges). Denote by hk(G) the number of unordered pairs of vertices in the graph G whose degrees differ by less than k. We aim to determine the smallest possible value f(n,k) of the quantity hk(G). Interest in this question is motivated by the fact that the bipartite analogue of the problem enabled S. Cichomski and F. Petrov to prove the Burdzy -- Pitman conjecture on the spread of independent coherent random variables. The problem has been solved under a number of restrictions on n and k. A conjecture about the answer in the general case is also presented.