On the Codegree graphs of finite groups
Abstract
The codegree of an irreducible character of a finite group G is defined as |G:|/(1). The codegree graph (G) of a finite group G is the graph whose vertices are the prime divisors of |G|, where two distinct primes p and q are adjacent if and only if pq divides the codegree of some irreducible character of G. In this paper, we prove that a graph can occur as a codegree graph (G) of some finite group G if and only if its complement is triangle-free and 3-colorable. This generalizes the known characterization for codegree graphs from solvable groups to all finite groups. As an application, we give a full classification of all groups for which (G) is a 5-cycle. We also investigate conditions under which the codegree graph coincides with or differs from the prime graph for solvable groups.
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