Cluster Duality for Lagrangian and Orthogonal Grassmannians

Published 1 Feb 2021 in math.CO | (2102.01054v1)

Abstract: In [RW19] Rietsch and Williams relate cluster structures and mirror symmetry for type A Grassmannians Gr(k, n), and use this interaction to construct Newton-Okounkov bodies and associated toric degenerations. In this article we define a cluster seed for the Lagrangian Grassmannian, and prove that the associated Newton-Okounkov body agrees up to unimodular equivalence with a polytope obtained from the superpotential defined by Pech and Rietsch on the mirror Orthogonal Grassmannian in [PR13].

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Charles Wang

Cluster Duality for Lagrangian and Orthogonal Grassmannians

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