On the combinatorics of string polytopes
Abstract
For a reduced word i of the longest element in the Weyl group of SLn+1(C), one can associate the string cone C i which parametrizes the dual canonical bases. In this paper, we classify all i's such that C i is simplicial. We also prove that for any regular dominant weight λ of sln+1(C), the corresponding string polytope i(λ) is unimodularly equivalent to the Gelfand-Cetlin polytope associated to λ if and only if C i is simplicial. Thus we completely characterize Gelfand-Cetlin type string polytopes in terms of i.
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