Permutahedra, Lusztig varieties, degenerations, and subdivisions

Abstract

We present an embedded (in G/B) degeneration of Lusztig varieties (which generalize type A Hessenberg varieties) to certain unions of Richardson varieties, giving a simultaneous reproof (and extension) of results of Anderson--Tymoczko, Harada--Horiguchi--Masuda--Park, and Kim. Although torus-equivariant, the degeneration is not Gröbner. In the case that the Lusztig variety is the permutahedral toric variety, this degeneration provides a subdivision of the permutahedron into Bruhat interval polytopes, and we prove a more general result showing equivariant degenerations of projective toric varieties produce subdivisions of the moment polytope (as was shown in the Gröbner case by Sturmfels). A Gröbner degeneration would result in a regular subdivision, and despite our degeneration not being Gröbner we show in types A,B,C that our subdivisions of the permutahedron are indeed regular.

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