On the Independence Number of the Prime-Coprime Graph of a Finite Group

Abstract

The prime-coprime graph (G) of a finite group G is the simple graph with vertex set G, where two distinct elements are adjacent whenever the greatest common divisor of their orders is either 1 or a prime. We characterize all finite groups G for which (G) is a split graph. We establish a general lower bound for the independence number of (G) of an arbitrary finite group G. Moreover, we explicitly compute the independence number of (G) for several distinguished families of finite groups, including cyclic, dihedral, dicyclic, and semidihedral groups.