Deformation cone of Tesler polytopes

Abstract

For a ∈ ≥ 0n, the Tesler polytope n(a) is the set of upper triangular matrices with non-negative entries whose hook sum vector is . We first give a different proof of the known fact that for every fixed a0 ∈ R>0n, all the Tesler polytopes n(a) are deformations of n(a0). We then calculate the deformation cone of n(a0). In the process, we also show that any deformation of n(a0) is a translation of a Tesler polytope. Lastly, we consider a larger family of polytopes called flow polytopes which contains the family of Tesler polytopes and give a characterization on which flow polytopes are deformations of n(a0).

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