Geodesic
On the number of partition weights with Kostka multiplicity one
Zachary Gates1 ; Brian Goldman2 ; C. Ryan Vinroot2
1University of Virginia
2College of William and Mary
The electronic journal of combinatorics, Tome 19 (2012) no. 4

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Zbl
Given a positive integer $n$, and partitions $\lambda$ and $\mu$ of $n$, let $K_{\lambda \mu}$ denote the Kostka number, which is the number of semistandard Young tableaux of shape $\lambda$ and weight $\mu$. Let $J(\lambda)$ denote the number of $\mu$ such that $K_{\lambda \mu} = 1$. By applying a result of Berenshtein and Zelevinskii, we obtain a formula for $J(\lambda)$ in terms of restricted partition functions, which is recursive in the number of distinct part sizes of $\lambda$. We use this to classify all partitions $\lambda$ such that $J(\lambda) = 1$ and all $\lambda$ such that $J(\lambda) = 2$. We then consider signed tableaux, where a semistandard signed tableau of shape $\lambda$ has entries from the ordered set $\{0 < \bar{1} < 1 < \bar{2} < 2 < \cdots \}$, and such that $i$ and $\bar{i}$ contribute equally to the weight. For a weight $(w_0, \mu)$ with $\mu$ a partition, the signed Kostka number $K^{\pm}_{\lambda,(w_0, \mu)}$ is defined as the number of semistandard signed tableaux of shape $\lambda$ and weight $(w_0, \mu)$, and $J^{\pm}(\lambda)$ is then defined to be the number of weights $(w_0, \mu)$ such that $K^{\pm}_{\lambda, (w_0, \mu)} = 1$. Using different methods than in the unsigned case, we find that the only nonzero value which $J^{\pm}(\lambda)$ can take is $1$, and we find all sequences of partitions with this property. We conclude with an application of these results on signed tableaux to the character theory of finite unitary groups.
DOI : 10.37236/2574
Classification : 05A17, 05A19
Mots-clés : partitions, tableaux, Kostka numbers

Zachary Gates  1   ; Brian Goldman  2   ; C. Ryan Vinroot  2

1 University of Virginia
2 College of William and Mary 
Zachary Gates; Brian Goldman; C. Ryan Vinroot. On the number of partition weights with Kostka multiplicity one. The electronic journal of combinatorics, Tome 19 (2012) no. 4. doi: 10.37236/2574
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     title = {On the number of partition weights with {Kostka} multiplicity one},
     journal = {The electronic journal of combinatorics},
     year = {2012},
     volume = {19},
     number = {4},
     doi = {10.37236/2574},
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     url = {http://geodesic.mathdoc.fr/articles/10.37236/2574/}
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