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A bijective proof of Kohnert's rule for Schubert polynomials

Published 2 Mar 2020 in math.CO and math.AG | (2003.01211v2)

Abstract: Kohnert proposed the first monomial positive formula for Schubert polynomials as the generating polynomial for certain unit cell diagrams obtained from the Rothe diagram of a permutation. Billey, Jockusch and Stanley gave the first proven formula for Schubert polynomials as the generating polynomial for compatible sequences of reduced words of a permutation. In this paper, we give an explicit bijection between these two models, thereby definitively proving Kohnert's rule for Schubert polynomials.

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Authors (1)

  1. Sami H. Assaf 

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