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The puzzle conjecture for the cohomology of two-step flag manifolds

We prove a conjecture of Knutson asserting that the Schubert structure constants of the cohomology ring of a two-step flag variety are equal to the number of puzzles with specified border labels that can be created using a list of eight puzzle pieces. As a consequence, we obtain a puzzle formula for the Gromov-Witten invariants defining the small quantum cohomology ring of a Grassmann variety of type A. The proof of the conjecture proceeds by showing that the puzzle formula defines an associative product on the cohomology ring of the two-step flag variety. It is based on an explicit bijection of gashed puzzles that is analogous to the jeu de taquin algorithm but more complicated.

preprint2016arXivOpen access
Anders Skovsted BuchAndrew KreschKevin PurbhooHarry Tamvakis
math.CO
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Anders Skovsted BuchAndrew KreschKevin PurbhooHarry Tamvakis

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