On the character degree graph of solvable groups

Abstract

Let \(G\) be a finite solvable group, and let \((G)\) denote the prime graph built on the set of degrees of the irreducible complex characters of \(G\). A fundamental result by P.P. P\'alfy asserts that the complement (G) of the graph \((G)\) does not contain any cycle of length \(3\). In this paper we generalize P\'alfy's result, showing that (G) does not contain any cycle of odd length, whence it is a bipartite graph. As an immediate consequence, the set of vertices of \((G)\) can be covered by two subsets, each inducing a complete subgraph. The latter property yields in turn that if \(n\) is the clique number of \((G)\), then \((G)\) has at most \(2n\) vertices. This confirms a conjecture by Z. Akhlaghi and H.P. Tong-Viet, and provides some evidence for the famous \(\)-\(σ\) conjecture by B. Huppert.