Prasad's Conjecture about dualizing involutions
Abstract
Let G be a connected reductive group defined over a finite field Fq with corresponding Frobenius F. Let G denote the duality involution defined by D. Prasad under the hypothesis 2H1(F,Z(G))=0, where Z(G) denotes the center of G. We show that for each irreducible character of GF, the involution G takes to its dual if and only if for a suitable Jordan decomposition of characters, an associated unipotent character u has Frobenius eigenvalues 1. As a corollary, we obtain that if G has no exceptional factors and satisfies 2H1(F,Z(G))=0, then the duality involution G takes to its dual for each irreducible character of GF. Our results resolve a finite group counterpart of a conjecture of D.~Prasad.
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