Crystal graphs for shifted tableaux
classification
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crystalshiftedtableauxschurdefinefunctionsoperatorspositive
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We define crystal operators on semistandard shifted tableaux, giving a new proof that Schur $P$-functions are Schur positive. We define a queer crystal operator to construct a connected queer crystal on semistandard shifted tableaux of a given shape, providing a new proof that products of Schur $P$-functions are Schur $P$-positive. We also give a rectification map from shifted tableaux to Young tableaux that commutes with the crystal operators and provides a dual algorithm to shifted insertion.
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Forward citations
Cited by 1 Pith paper
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Queer Supercrystal Structure for Increasing Factorizations of Fixed-Point-Free Involution Words
Proves that increasing factorizations of FPF involution words carry queer supercrystal structure by bijection to primed tableaux using Marberg's symplectic shifted Hecke insertion.
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