Newton-Okounkov bodies, cluster duality, and mirror symmetry for Grassmannians

Abstract

We use cluster structures and mirror symmetry to explicitly describe a natural class of Newton-Okounkov bodies for Grassmannians. We consider the Grassmannian X=Grn-k( Cn), as well as the mirror dual Landau-Ginzburg model (X, Wq:X C), where X is the complement of a particular anti-canonical divisor in a Langlands dual Grassmannian X = Grk(( Cn)*), and the superpotential Wq has a simple expression in terms of Pl\"ucker coordinates. Grassmannians simultaneously have the structure of an A-cluster variety and an X-cluster variety. Given a cluster seed G, we consider two associated coordinate systems: a X-cluster chart G:( C*)k(n-k) X and a A-cluster chart G:( C*)k(n-k) X. To each X-cluster chart G and ample `boundary divisor' D in X X, we associate a Newton-Okounkov body G(D) in Rk(n-k), which is defined as the convex hull of rational points. On the other hand using the A-cluster chart G on the mirror side, we obtain a set of rational polytopes, described by inequalities, by writing the superpotential Wq in the A-cluster coordinates, and then "tropicalising". Our main result is that the Newton-Okounkov bodies G(D) and the polytopes obtained by tropicalisation coincide. As an application, we construct degenerations of the Grassmannian to toric varieties corresponding to these Newton-Okounkov bodies. Additionally, when G corresponds to a plabic graph, we give a formula for the lattice points of the Newton-Okounkov bodies, which has an interpretation in terms of quantum Schubert calculus.