In mathematics, the AlvisâÂÂCurtis duality is a duality operation on the characters of a reductive group over a finite field, introduced by and studied by his student . introduced a similar duality operation for Lie algebras.
AlvisâÂÂCurtis duality has order 2 and is an isometry on generalized characters.
discusses AlvisâÂÂCurtis duality in detail.
The dual ö* of a character ö of a finite group G with a split BN-pair is defined to be
Here the sum is over all subsets J of the set R of simple roots of the Coxeter system of G. The character ö is the truncation of ö to the parabolic subgroup P<sub>J</sub> of the subset J, given by restricting ö to P<sub>J</sub> and then taking the space of invariants of the unipotent radical of P<sub>J</sub>, and ö is the induced representation of G. (The operation of truncation is the adjoint functor of parabolic induction.)