自旋Kostka多项式和顶点算子

Pub Date : 2023-03-19 DOI:10.2140/pjm.2023.325.127

N. Jing, Ning Liu

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引用次数: 1

摘要

利用Hall-Littlewood对称函数和Schur的q -函数的顶点算子实现，给出了自旋Kostka-Foulkes多项式$K^-_{\xi\mu}(t)$的代数迭代公式。基于运算公式，得到了与Kostka多项式平行的更有利的性质。特别地，我们得到了(未移位的)标记表的数目的一些公式。作为应用，我们证实了Aokage关于Schur $P$ -函数用Schur函数展开的一个猜想。下面列出了$|\xi|\leq6$的$K^-_{\xi\mu}(t)$表。

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Spin Kostka polynomials and vertex operators

An algebraic iterative formula for the spin Kostka-Foulkes polynomial $K^-_{\xi\mu}(t)$ is given using vertex operator realizations of Hall-Littlewood symmetric functions and Schur's Q-functions. Based on the operational formula, more favorable properties are obtained parallel to the Kostka polynomial. In particular, we obtain some formulae for the number of (unshifted) marked tableaux. As an application, we confirmed a conjecture of Aokage on the expansion of the Schur $P$-function in terms of Schur functions. Tables of $K^-_{\xi\mu}(t)$ for $|\xi|\leq6$ are listed.

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