Toric orbifolds associated with partitioned weight polytopes in classical types

Abstract

Given a root system of type An, Bn, Cn, or Dn in Euclidean space E, let W be the associated Weyl group. For a point p ∈ E not orthogonal to any of the roots in , we consider the W-permutohedron PW, which is the convex hull of the W-orbit of p. The representation of W on the rational cohomology ring H(X) of the toric variety X associated to (the normal fan to) PW has been studied by various authors. Let \s1,…,sn\ be a complete set of simple reflections in W. For K ⊂eq [n], let WK be the standard parabolic subgroup of W generated by \sk:k ∈ K\. We show that the fixed subring H(X)WK is isomorphic to the cohomology ring of the toric variety X(K) associated to a polytope obtained by intersecting PW with half-spaces bounded by reflecting hyperplanes for the given generators of WK. By a result of Balibanu--Crooks, the cohomology rings H(X(K)) are isomorphic with cohomology rings of certain regular Hessenberg varieties.