Zeros and roots of unity in character tables

Abstract

For any finite group G, Thompson proved that, for each ∈ Irr(G), (g) is a root of unity or zero for more than a third of the elements g∈ G, and Gallagher proved that, for each larger than average class gG, (g) is a root of unity or zero for more than a third of the irreducible characters ∈ Irr(G). We show that in many cases "more than a third" can be replaced by "more than half".