Restrictions of characters in p-solvable groups

Abstract

Let G be a p-solvable group, P a p-subgroup and chi in Irr(G) such that chi(1)p |G:P|p. We prove that the restriction chiP is a sum of characters induced from subgroups Q P such that chi(1)p=|G:Q|p. This generalizes previous results by Giannelli--Navarro and Giannelli--Sambale on the number of linear constituents of chiP. Although this statement does not hold for arbitrary groups, we conjecture a weaker version which can be seen as an extension of Brauer--Nesbitt's theorem on characters of p-defect zero. It also extends a conjecture of Wilde.

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