Average number of zeros of characters of finite groups

Abstract

There has been some interest on how the average character degree affects the structure of a finite group. We define, and denote by anz(G) , the average number of zeros of characters of a finite group G as the number of zeros in the character table of G divided by the number of irreducible characters of G . We show that if anz(G) < 1 , then the group G is solvable and also that if anz(G) < 12 , then G is supersolvable. We characterise abelian groups by showing that anz(G) < 13 if and only if G is abelian.