Shi variety corresponding to an affine Weyl group
Abstract
Let W be an irreducible Weyl group and Wa its affine Weyl group. In this article we show that there exists a bijection between Wa and the integral points of an affine variety, denoted XWa, which we call the Shi variety of Wa. In order to do so, we use Jian-Yi Shi's characterization of alcoves in affine Weyl groups. We then study this variety further. We highlight combinatorial properties of the irreducible components of XWa and we show how they are related to a fundamental parallelepiped PH.
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