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Alcove random walks, k-Schur functions and the minimal boundary of the k-bounded partition poset

We use k-Schur functions to get the minimal boundary of the k-bounded partition poset. This permits to describe the central random walks on affine Grassmannian elements of type A and yields a polynomial expression for their drift. We also recover Rietsch's parametriza-tion of totally nonnegative unitriangular Toeplitz matrices without using quantum cohomology of flag varieties. All the homeomorphisms we define can moreover be made explicit by using the combinatorics of k-Schur functions and elementary computations based on Perron-Frobenius theorem.

preprint2020arXivOpen access
Cédric LecouveyPierre Tarrago
math.COmath.RTmath.PR
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Cédric LecouveyPierre Tarrago

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