On enhanced reductive groups (I): Parabolic Schur algebras and the dualities related to degenerate double Hecke algebras

Abstract

An enhanced algebraic group of G=(V) over is a product variety (V)× V, endowed with an enhanced cross product. Associated with a natural tensor representation of , there are naturally Levi and parabolic Schur algebras L and P respectively. We precisely investigate their structures, and study the dualities on the enhanced tensor representations for variant groups and algebras. In this course, an algebraic model of so-called degenerate double Hecke algebras (DDHA) is produced, and becomes a powerful implement. The connection between L and DDHA gives rise to two results for the classical representations of (V): (i) A duality between (V)× and DDHA where is the one-dimensional multiplicative group; (ii) A branching duality formula. With aid of the above discussion, we further obtain a parabolic Schur-Weyl duality for . What is more, the parabolic Schur subalgebra turns out to have only one block. The Cartan invariants for this algebra are precisely determined.