Character covering number of $\mathrm{PSL}_2 (q)$

Saikat Panja

Character covering number of PSL2 (q)

Abstract

For a group G and a character of G, let c() denote the set of all irreducible characters of G, occurring in . We prove that whenever q≥ 8, all non-trivial irreducible character of PSL2(q) satisfies c(4)=Irr(PSL2(q)) if q=22m+1 and c(3)=Irr(PSL2(q)) otherwise.

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