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The Smith Normal Form of a Specialized Jacobi-Trudi Matrix

Published 19 Aug 2015 in math.CO | (1508.04746v2)

Abstract: Let $\mathrm{JT}\lambda$ be the Jacobi-Trudi matrix corresponding to the partition $\lambda$, so $\det\mathrm{JT}\lambda$ is the Schur function $s_\lambda$ in the variables $x_1,x_2,\dots$. Set $x_1=\cdots=x_n=1$ and all other $x_i=0$. Then the entries of $\mathrm{JT}\lambda$ become polynomials in $n$ of the form ${n+j-1\choose j}$. We determine the Smith normal form over the ring $\mathbb{Q}[n]$ of this specialization of $\mathrm{JT}\lambda$. The proof carries over to the specialization $x_i=q{i-1}$ for $1\leq i\leq n$ and $x_i=0$ for $i>n$, where we set $qn=y$ and work over the ring $\mathbb{Q}(q)[y]$.

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