Irregular Subgraphs

Abstract

We suggest two related conjectures dealing with the existence of spanning irregular subgraphs of graphs. The first asserts that any d-regular graph on n vertices contains a spanning subgraph in which the number of vertices of each degree between 0 and d deviates from nd+1 by at most 2. The second is that every graph on n vertices with minimum degree δ contains a spanning subgraph in which the number of vertices of each degree does not exceed nδ+1+2. Both conjectures remain open, but we prove several asymptotic relaxations for graphs with a large number of vertices n. In particular we show that if d3 n ≤ o(n) then every d-regular graph with n vertices contains a spanning subgraph in which the number of vertices of each degree between 0 and d is (1+o(1))nd+1. We also prove that any graph with n vertices and minimum degree δ contains a spanning subgraph in which no degree is repeated more than (1+o(1))nδ+1+2 times.