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arxiv 2010.04079 v1 pith:F4VBW7VM submitted 2020-10-08 math.CO math.AC

Combinatorial Mutations and Block Diagonal Polytopes

classification math.CO math.AC
keywords polytopesmatchingmutationstoricfieldriseblockcertain
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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Matching fields were introduced by Sturmfels and Zelevinsky to study certain Newton polytopes and more recently have been shown to give rise to toric degenerations of various families of varieties. Whenever a matching field gives rise to a toric degeneration, the associated polytope of the toric variety coincides with the matching field polytope. We study combinatorial mutations, which are analogues of cluster mutations for polytopes, of matching field polytopes and show that the property of giving rise to a toric degeneration of the Grassmannians, is preserved by mutation. Moreover the polytopes arising through mutations are Newton-Okounkov bodies for the Grassmannians with respect to certain full-rank valuations. We produce a large family of such polytopes, extending the family of so-called block diagonal matching fields.

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