Combinatorial mutations of Gelfand–Tsetlin polytopes, Feigin–Fourier–Littelmann–Vinberg polytopes, and block diagonal matching field polytopes
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https://hdl.handle.net/10037/35111Date
2024-02-19Type
Journal articleTidsskriftartikkel
Peer reviewed
Abstract
The Gelfand-Tsetlin and the Feigin–Fourier–Littelmann–Vinberg polytopes for the
Grassmannians are defined, from the perspective of representation theory, to
parametrize certain bases for highest weight irreducible modules. These polytopes
are Newton-Okounkov bodies for the Grassmannian and, in particular, the GT
polytope is an example of a string polytope. The polytopes admit a combinatorial
description as the Stanley’s order and chain polytopes of a certain poset, as
shown by Ardila, Bliem and Salazar. We prove that these polytopes occur among
matching field polytopes. Moreover, we show that they are related by a sequence
of combinatorial mutations that passes only through matching field polytopes. As
a result, we obtain a family of matching fields that give rise to toric degenerations
for the Grassmannians. Moreover, all polytopes in the family are Newton-Okounkov
bodies for the Grassmannians.
Publisher
ElsevierCitation
Clarke, Higashitani, Mohammadi. Combinatorial mutations of Gelfand–Tsetlin polytopes, Feigin–Fourier–Littelmann–Vinberg polytopes, and block diagonal matching field polytopes. Journal of Pure and Applied Algebra. 2024;228(7)Metadata
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