Zeros in the character tables of symmetric groups with an $\ell $ -core index

Pub Date : 2022-05-19 DOI:10.4153/S0008439522000443

Eleanor Mcspirit, K. Ono

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引用次数: 3

Abstract

Abstract Let $\mathcal {C}_n =\left [\chi _{\lambda }(\mu )\right ]_{\lambda , \mu }$ be the character table for $S_n,$ where the indices $\lambda $ and $\mu $ run over the $p(n)$ many integer partitions of $n.$ In this note, we study $Z_{\ell }(n),$ the number of zero entries $\chi _{\lambda }(\mu )$ in $\mathcal {C}_n,$ where $\lambda $ is an $\ell $ -core partition of $n.$ For every prime $\ell \geq 5,$ we prove an asymptotic formula of the form $$ \begin{align*}Z_{\ell}(n)\sim \alpha_{\ell}\cdot \sigma_{\ell}(n+\delta_{\ell})p(n)\gg_{\ell} n^{\frac{\ell-5}{2}}e^{\pi\sqrt{2n/3}}, \end{align*} $$ where $\sigma _{\ell }(n)$ is a twisted Legendre symbol divisor function, $\delta _{\ell }:=(\ell ^2-1)/24,$ and $1/\alpha _{\ell }>0$ is a normalization of the Dirichlet L-value $L\left (\left ( \frac {\cdot }{\ell } \right ),\frac {\ell -1}{2}\right ).$ For primes $\ell $ and $n>\ell ^6/24,$ we show that $\chi _{\lambda }(\mu )=0$ whenever $\lambda $ and $\mu $ are both $\ell $ -cores. Furthermore, if $Z^*_{\ell }(n)$ is the number of zero entries indexed by two $\ell $ -cores, then, for $\ell \geq 5$ , we obtain the asymptotic $$ \begin{align*}Z^*_{\ell}(n)\sim \alpha_{\ell}^2 \cdot \sigma_{\ell}( n+\delta_{\ell})^2 \gg_{\ell} n^{\ell-3}. \end{align*} $$

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具有$\ell$核心索引的对称群的字符表中的零

抽象Let$\mathcal{C}_n=\left[\chi｛\lambda｝（\mu）\right]｛\lLambda，\mu｝$是$S_n，$的字符表，其中索引$\lamba$和$\mu$在$n的$p（n）$多个整数分区上运行。在本文中，我们研究$Z_｛\ell｝（n），$\mathcal中零项$\chi｛\lambda｝（\mu）$的数量{C}_n，$，其中$\lambda$是$n.$的$\ell$核心分区。对于每一个素数$\ell\geq5，$我们证明了形式为$$\boot｛align*｝Z_｛\ell｝｛n）\sim\alpha_｛ell｝\cdot\sigma\｛ell}｛n+\delta_｛el｝p（n）\gg_｛ll｝n^｛\frac｛\ell-5｝{2｝｝｝｝e^｛\pi\sqrt｛2n/3｝｝}｝的n渐近公式，\ end｛align*｝$$$其中$\sigma｛\eell｝（n）$是一个扭曲的勒让德符号除数函数，$\delta｛\el｝：=（\ell^2-1）/24，$和$1/\alpha｛\ell｝>0$是Dirichlet L-值$L\left（\left）（\frac｛\cdot｝｛\ell｝\right），\frac{\ell-1｝{2｝\right.）的归一化$对于素数$\ell$和$n>\ell^6/24，我们证明了$\chi｛\lambda｝（\mu）=0$，只要$\lambda$和$\mu$都是$\ell$-核。此外，如果$Z^*{ell}（n）$是由两个$\ell-核索引的零条目的数量，那么，对于$\ell\geq5$，我们获得了渐近的$$$\boot{align*}Z^*｛ell｝（n）\sim\alpha_{ell｝^2 \cdot\sigma_{ell}（n+\delta_{ell}}）^2 3｝。\结束{align*}$$

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