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

IF 0.5 4区数学 Q3 MATHEMATICS

Canadian Mathematical Bulletin-Bulletin Canadien De Mathematiques 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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来源期刊

Canadian Mathematical Bulletin-Bulletin Canadien De Mathematiques 数学-数学

CiteScore

1.30

自引率

0.00%

发文量

审稿时长

24 months

期刊介绍： The Canadian Mathematical Bulletin was established in 1958 to publish original, high-quality research papers in all branches of mathematics and to accommodate the growing demand for shorter research papers. The Bulletin is a companion publication to the Canadian Journal of Mathematics that publishes longer papers. New research papers are published continuously online and collated into print issues four times each year. To be submitted to the Bulletin, papers should be at most 18 pages long and may be written in English or in French. Longer papers should be submitted to the Canadian Journal of Mathematics. Fondé en 1958, le Bulletin canadien de mathématiques (BCM) publie des articles d’avant-garde et de grande qualité dans toutes les branches des mathématiques, de même que pour répondre à la demande croissante d’articles scientifiques plus brefs. Le BCM se veut une publication complémentaire au Journal canadien de mathématiques, qui publie de longs articles. En ligne, il propose constamment de nouveaux articles de recherche, puis les réunit dans des numéros imprimés quatre fois par année. Les textes présentés au BCM doivent compter au plus 18 pages et être rédigés en anglais ou en français. C’est le Journal canadien de mathématiques qui reçoit les articles plus longs.