The Coxeter Flag Variety

Abstract

For a Coxeter element c in a Weyl group W, we define the c-Coxeter flag variety CFlc⊂ G/B as the union of left-translated Richardson varieties w-1Xwcw. This is a complex of toric varieties whose geometry is governed by the lattice NC(W,c) of c-noncrossing partitions. We show that CFlc is the common vanishing locus of the generalized Pl\"ucker coordinates indexed by WNC(W,c). We also construct an explicit affine paving of CFlc and identify the T-weights of each cell in terms of c-clusters. This paving gives a GKM description of H(CFlc) and HTad(CFlc) in terms of the induced Cayley subgraph on NC(W,c), and we show these rings are naturally isomorphic for different choices of c. In type A, this recovers the quasisymmetric flag variety for a special c, and for general c we show the cohomology ring has a presentation as permuted quasisymmetric coinvariants.