Shelling totally nonnegative flag varieties

Abstract

In this paper we study the partially ordered set QJ of cells in Rietsch's cell decomposition of the totally nonnegative part of an arbitrary flag variety PJ≥ 0. Our goal is to understand the geometry of PJ≥ 0: Lusztig has proved that this space is contractible, but it is unknown whether the closure of each cell is contractible, and whether PJ≥ 0 is homeomorphic to a ball. The order complex |QJ| is a simplicial complex which can be thought of as a combinatorial approximation of PJ≥ 0. Using combinatorial tools such as Bjorner's EL-labellings and Dyer's reflection orders, we prove that QJ is graded, thin and EL-shellable. As a corollary, we deduce that QJ is Eulerian and that the Euler characteristic of the closure of each cell is 1. Additionally, our results imply that |QJ| is homeomorphic to a ball, and moreover, that QJ is the face poset of some regular CW complex homeomorphic to a ball.

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