对称群的环指示符的同余

Q3 Mathematics Communications in Mathematics Pub Date : 2022-11-28 DOI:10.46298/cm.10391

Abdelaziz Bellagh, Assia Oulebsir

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引用次数: 0

摘要

设$n$为正整数，设$C_n$为对称群$S_n$的循环指示器。Carlitz证明了如果$p$是素数，如果$r$是负整数，那么我们有同余$C_{r+np}\equiv(X_1^p-X_p)^nC_r \mod{pZ_p[X_1,\cdots,X_{r+np}]},$，其中$Z_p$是$p$ -adicintegers的环。我们证明对于$p\neq 2$，前面的同余对$npZ_p[X_1,\cdots,X_{r+np}]$取模成立。这使我们能够证明一个Junod的猜想对于meixner多项式。

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Congruences for the cycle indicator of the symmetric group

Let $n$ be a positive integer and let $C_n$ be the cycle indicator of the symmetric group $S_n$. Carlitz proved that if $p$ is a prime, and if $r$ is a non negative integer, then we have the congruence $C_{r+np}\equiv (X_1^p-X_p)^nC_r \mod{pZ_p[X_1,\cdots,X_{r+np}]},$ where $Z_p$ is the ring of $p$-adic integers. We prove that for $p\neq 2$, the preceding congruence holds modulo $npZ_p[X_1,\cdots,X_{r+np}]$. This allows us to prove a Junod's conjecture for Meixner polynomials.

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来源期刊

Communications in Mathematics Mathematics-Mathematics (all)

CiteScore

1.00

自引率

0.00%

发文量

审稿时长

45 weeks

期刊介绍： Communications in Mathematics publishes research and survey papers in all areas of pure and applied mathematics. To be acceptable for publication, the paper must be significant, original and correct. High quality review papers of interest to a wide range of scientists in mathematics and its applications are equally welcome.

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