Denseness results for zeros and roots of unity in character tables
Abstract
For any irreducible character of a finite group G, let θ() denote the proportion of elements g∈ G for which (g) is either zero or a root of unity. Then for any L∈[1/2,1] and any ε>0, there exists an irreducible character of a finite group such that |θ()-L|<ε.
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