Levi-type Schur-Sergeev duality for general linear super groups

Abstract

In this note, we investigate a kind of double centralizer property for general linear supergroups. For the super space V=Km n over an algebraically closed field K whose characteristic is not equal to 2, we consider its Z2-homogeneous one-dimensional extension V=V, and the natural action of the supergroup G:=GL(V)× Gm on V. Then we have the tensor product supermodule (V r, r) of G. We present a kind of generalized Schur-Sergeev duality which is said that the Schur superalgebras S'(m|n,r) of G and a so-called weak degenerate double Hecke algebra Hr are double centralizers. The weak degenerate double Hecke algebra is an infinite dimensional algebra, which has a natural representation on the tensor product space. This notion comes from B-Y-Y2020, with a little modification.