Key polynomials and a flagged Littlewood-Richardson rule

Demazure crystals for Kohnert polynomials, Set-valued tableaux rule for Lascoux polynomials, Relating the right key to the type A filling map and minimal defining chains, Skew key polynomials and a generalized Littlewood-Richardson rule, Inclusion-exclusion on Schubert polynomials, The skew Schubert polynomials, Combinatorial bases of polynomials, A Pieri rule for key polynomials, A Demazure crystal construction for Schubert polynomials, Schubert polynomials: A historical approach, Upper bounds of Schubert polynomials, Schubert polynomials as integer point transforms of generalized permutahedra, Plactification, Kohnert Polynomials, Reduced words and plane partitions, A direct way to find the right key of a semistandard Young tableau, Logarithmic concavity of Schur and related polynomials, Noncommutative LR coefficients and crystal reflection operators, From the weak Bruhat order to crystal posets, Zero-one Schubert polynomials, A major-index preserving map on fillings, Weak dual equivalence for polynomials, Grothendieck-to-Lascoux expansions, Monk's rule for Demazure characters of the general linear group, A bijection between \(K\)-Kohnert diagrams and reverse set-valued tableaux, Top-degree components of Grothendieck and Lascoux polynomials, On the Ehrhart polynomial of Schubert matroids, Multiplicity-free key polynomials, Demazure crystals and the Schur positivity of Catalan functions, Kohnert tableaux and a lifting of quasi-Schur functions, Four positive formulae for type \(A\) quiver polynomials, Semistandard tableaux for Demazure characters (key polynomials) and their atoms, Asymmetric Function Theory, Colored five-vertex models and Demazure atoms, The space of triangles, vanishing theorems, and combinatorics, Coxeter combinatorics and spherical Schubert geometry, Polynomials from Combinatorial -theory, Lattice Points in the Newton Polytopes of Key Polynomials, Slide polynomials, Set-valued skyline fillings, Flagged \(( \mathcal{P}, \rho)\)-partitions, An analogue of the Robinson-Schensted-Knuth correspondence and non-symmetric Cauchy kernels for truncated staircases, Vertices of Schubitopes, A Demazure character formula for the product monomial crystal, A generalization of Edelman-Greene insertion for Schubert polynomials, Nonsymmetric Macdonald polynomials and a refinement of Kostka–Foulkes polynomials, Decomposition of tensor products of Demazure crystals, Crystal structures for symmetric Grothendieck polynomials, Compact formulas for Macdonald polynomials and quasisymmetric Macdonald polynomials, K-theoretic crystals for set-valued tableaux of rectangular shapes, A Pieri formula in the Grothendieck ring of a flag bundle, Lifting the dual immaculate functions, The CDE property for skew vexillary permutations, Polynomial bases: Positivity and Schur multiplication, Refinements of the Littlewood-Richardson rule, Chains in the Bruhat order, An explicit construction of type A Demazure atoms, Borel-Weil theorem for configuration varieties and Schur modules, \(K\)-theoretic polynomials, Skew polynomials and extended Schur functions, Percentage-avoiding, northwest shapes and peelable tableaux, Row bounds needed to justifiably express flagged Schur functions with Gessel-Viennot determinants, Slide multiplicity free key polynomials, Diagram rules for the generation of Schubert polynomials, The ``Young and ``reverse dichotomy of polynomials, Newton polytopes in algebraic combinatorics, Robinson–Schensted–Knuth correspondence in the representation theory of the general linear group over a non-archimedean local field, Generalized permutahedra and Schubert calculus, A smooth space of tetrahedra., Kohnert's rule for flagged Schur modules, Accessible proof of standard monomial basis for coordinatization of Schubert sets of flags, Polynomials defined by tableaux and linear recurrences

• Noncommutative Schubert polynomials
• Flagged Schur functions, Schubert polynomials, and symmetrizing operators
• Binomial determinants, paths, and hook length formulae
• Schubert polynomials and the Littlewood-Richardson rule
• Some connections between the Littlewood-Richardson rule and the construction of Schensted
• An extension of Schensted's theorem
• The representation theory of the symmetric groups
• On Schensted's construction and the multiplication of Schur functions
• Some combinatorial properties of Schubert polynomials
• Schubert polynomials and the nilCoxeter algebra
• Balanced tableaux
• Multiplying Schur functions
• A New Statistics on Words
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