Commutation of Shintani descent and Jordan decomposition

Abstract

Let GF be a finite group of Lie type, where G is a reductive group defined over Fq and F is a Frobenius root. Lusztig's Jordan decomposition parametrises the irreducible characters in a rational series E( GF,(s) G*F*) where s∈ G*F* by the series E(C G*(s)F*,1).We conjecture that the Shintani twisting preserves the space of class functions generated by the union of the E( GF,(s') G*F*) where(s') G*F* runs over the semi-simple classes of G*F* geometrically conjugate to s;further, extending the Jordan decomposition by linearity to this space, we conjecture that there is a way to fix Jordan decomposition such that it maps the Shintani twisting to the Shintani twisting on disconnected groups defined by Deshpande, which acts on the linear span of s' E(C G*(s')F*,1). We show a non-trivial case of this conjecture, the case where G is of type An-1with n prime.