2,072 research outputs found

    Schur polynomials, banded Toeplitz matrices and Widom's formula

    Full text link
    We prove that for arbitrary partitions λ⊆κ,\mathbf{\lambda} \subseteq \mathbf{\kappa}, and integers 0≤c<r≤n,0\leq c<r\leq n, the sequence of Schur polynomials S(κ+k⋅1c)/(λ+k⋅1r)(x1,...,xn)S_{(\mathbf{\kappa} + k\cdot \mathbf{1}^c)/(\mathbf{\lambda} + k\cdot \mathbf{1}^r)}(x_1,...,x_n) for kk sufficiently large, satisfy a linear recurrence. The roots of the characteristic equation are given explicitly. These recurrences are also valid for certain sequences of minors of banded Toeplitz matrices. In addition, we show that Widom's determinant formula from 1958 is a special case of a well-known identity for Schur polynomials

    Shifted symmetric functions and multirectangular coordinates of Young diagrams

    Full text link
    In this paper, we study shifted Schur functions Sμ⋆S_\mu^\star, as well as a new family of shifted symmetric functions Kμ\mathfrak{K}_\mu linked to Kostka numbers. We prove that both are polynomials in multi-rectangular coordinates, with nonnegative coefficients when written in terms of falling factorials. We then propose a conjectural generalization to the Jack setting. This conjecture is a lifting of Knop and Sahi's positivity result for usual Jack polynomials and resembles recent conjectures of Lassalle. We prove our conjecture for one-part partitions.Comment: 2nd version: minor modifications after referee comment
    • …
    corecore