A combinatorial approach to Donkin-Koppinen filtrations of general linear supergroups

Abstract

For a general linear supergroup G=GL(m|n), we consider a natural isomorphism φ: G U-× Gev × U+, where Gev is the even subsupergroup of G, and U-, U+ are appropriate odd unipotent subsupergroups of G. We compute the action of odd superderivations on the images φ*(xij) of the generators of K[G]. We describe a specific ordering of the dominant weights X(T)+ of GL(m|n) for which there exists a Donkin-Koppinen filtration of the coordinate algebra K[G]. Let be a finitely generated ideal of X(T)+ and O(K[G]) be the largest -subsupermodule of K[G] having simple composition factors of highest weights λ∈ . We apply combinatorial techniques, using generalized bideterminants, to determine a basis of G-superbimodules appearing in Donkin-Koppinen filtration of O(K[G]).