Differential operators and reflection group of type Bn

Abstract

In this note, we study the polynomial representation of the quantum Olshanetsky-Perelomov system for a finite reflection group W of type Bn. We endow the polynomial ring C [x1,…\\…, xn] with a structure of module over the Weyl algebra associated with the ring C [x1,…,xn]W of invariant polynomials under a reflections group W of type Bn. Then we study the polynomial representation of the ring of invariant differential operators under the reflections group W. We use the group representation theory namely the higher Specht polynomials associated with the reflection group W and establish a decomposition of that structure by providing explicitly the generators of the simple components.

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