Quantum analogues of Richardson varieties in the grassmannian and their toric degeneration

TL;DR

This paper explores quantum analogues of Richardson varieties in type A grassmannians, analyzing their algebraic properties and demonstrating their degeneration to quantum toric varieties within non-commutative algebraic geometry.

Contribution

It introduces quantum analogues of Richardson varieties' coordinate rings and proves they have an Algebra with a Straightening Law, leading to their degeneration into quantum toric varieties.

Findings

Quantum Richardson varieties have the structure of an Algebra with a Straightening Law.

These algebras degenerate to quantum analogues of toric varieties.

The study advances understanding of non-commutative geometric properties of quantum varieties.

Abstract

In the present paper, we are interested in natural quantum analogues of Richardson varieties in the type A grassmannians. To be more precise, the objects that we investigate are quantum analogues of the homogeneous coordinate rings of Richardson varieties which appear naturally in the theory of quantum groups. Our point of view, here, is geometric: we are interested in the regularity properties of these "non-commutative varieties", such as their irreducibility, normality, Cohen-Macaulayness... in the spirit of non-commutative algebraic geometry. A major step in our approach is to show that these algebras have the structure of an Algebra with a Straightening Law. From this, it follows that they degenerate to some quantum analogues of toric varieties.