Fock-Goncharov conjecture and polyhedral cones for U ⊂ SLn and base affine space SLn /U

Abstract

I prove several conjectures of GHKK on the cluster structure of SLn, which in particular imply the full Fock-Goncharov conjecture for the open double Bruhat cell A ⊂ SLn/U, for U ⊂ SLn a maximal unipotent subgroup. This endows the mirror cluster variety X with a canonical potential function W, and determines a canonical cone WT ≥ 0 ⊂ X(RT) of the mirror tropical space, whose integer points parametrize a basis of H0(SLn/U,OSLn/U), canonically determined by the open subset A ⊂ SLn/U. Each choice of seed identifies X(RT) with a real vector space, and WT ≥ 0 with a system of linear equations with integer coefficients, cutting out a polyhedral cone. We obtain in this way (generally) infinitely many parameterizations of the canonical basis as integer points of a polyhedral cone. For the usual initial seed of the double Bruhat cell, we recover the parametrizations of Berenstein-KazhdanBKaz,BKaz2 and Berenstein-ZelevinskyBZ96 by integer points of the Gelfand-Tsetlin cone.