Vanishing Elements of Prime Power Order
Abstract
An element x in a finite group G is said to be vanishing if some (complex) irreducible character of G takes value 0 at x. In this article, we prove that every non-abelian finite simple group, except SL2(4) and SL2(8), contains a vanishing element of prime power order whose conjugacy class size is divisible by three distinct primes. We use this result to obtain the following generalization of a result of Robati (2021): If G is a non-solvable finite group in which, the conjugacy class size of all the vanishing elements of prime power order has at most two distinct prime divisors, then G/Sol(G) is a direct product of mutually isomorphic simple groups among SL2(4) and SL2(8). (Sol(G) is the largest normal solvable subgroup of G.)
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