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arxiv: 2107.04264 · v2 · pith:ANG5QEJF · submitted 2021-07-09 · math.CO · math.AG· math.RT

Combinatorial mutations of Newton-Okounkov polytopes arising from plabic graphs

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classification math.CO math.AGmath.RT
keywords plabiccombinatorialgraphpolytopesclustergraphsgrassmannianmutation
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It is known that the homogeneous coordinate ring of a Grassmannian has a cluster structure, which is induced from the combinatorial structure of a plabic graph. A plabic graph is a certain bipartite graph described on the disk, and there is a family of plabic graphs giving a cluster structure of the same Grassmannian. Such plabic graphs are related by the operation called square move which can be considered as the mutation in cluster theory. By using a plabic graph, we also obtain the Newton--Okounkov polytope which gives a toric degeneration of the Grassmannian. The purposes of this article is to survey these phenomena and observe the behavior of Newton--Okounkov polytopes under the operation called the combinatorial mutation of polytopes. In particular, we reinterpret some operations defined for Newton--Okounkov polytopes using the combinatorial mutation.

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