MV polytopes and reduced double Bruhat cells

Abstract

When G is a complex reductive algebraic group, MV polytopes are in bijection with the non-negative tropical points of the unipotent group of G. By fixing w from the Weyl group, we can define MV polytopes whose highest vertex is labelled by w. We show that these polytopes are in bijection with the non-negative tropical points of the reduced double Bruhat cell labelled by w-1. To do this, we define a collection of generalized minor functions γnew which tropicalize on the reduced Bruhat cell to the BZ data of an MV polytope of highest vertex w. We also describe the combinatorial structure of MV polytopes of highest vertex w. We explicitly describe the map from the Weyl group to the subset of elements bounded by w in the Bruhat order which sends u v if the vertex labelled by u coincides with the vertex labelled by v for every MV polytope of highest vertex w. As a consequence of this map, we prove that these polytopes have vertices labelled by Weyl group elements less than w in the Bruhat order.