光滑排列上的一些组合结果

IF 0.4 Q4 MATHEMATICS, APPLIED Journal of Combinatorics Pub Date : 2019-12-10 DOI:10.4310/JOC.2021.v12.n2.a7
Shoni Gilboa, E. Lapid
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引用次数: 2

摘要

我们证明了任何光滑排列$\sigma\in S_n$都是由Bruhat区间$(S_n)_{\leq\sigma}$中的转置和$3$ -环的集合${\mathbf{C}}(\sigma)$表征的,并且$\sigma$是${\mathbf{C}}(\sigma)$中的转置的乘积(以一定的顺序)。我们还描述了地图的图像$\sigma\mapsto{\mathbf{C}}(\sigma)$。作为一个应用,我们证明了$\sigma$是光滑的当且仅当$(S_n)_{\leq\sigma}$与$S_n$的一个抛物子群的每个共轭的交允许极大值。这也给出了枚举平滑排列及其子类的另一种方法。最后,我们将共簇排列与光滑排列联系起来,并用富尔顿意义上的(co)本质集来重新表述结果。
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Some combinatorial results on smooth permutations
We show that any smooth permutation $\sigma\in S_n$ is characterized by the set ${\mathbf{C}}(\sigma)$ of transpositions and $3$-cycles in the Bruhat interval $(S_n)_{\leq\sigma}$, and that $\sigma$ is the product (in a certain order) of the transpositions in ${\mathbf{C}}(\sigma)$. We also characterize the image of the map $\sigma\mapsto{\mathbf{C}}(\sigma)$. As an application, we show that $\sigma$ is smooth if and only if the intersection of $(S_n)_{\leq\sigma}$ with every conjugate of a parabolic subgroup of $S_n$ admits a maximum. This also gives another approach for enumerating smooth permutations and subclasses thereof. Finally, we relate covexillary permutations to smooth ones and rephrase the results in terms of the (co)essential set in the sense of Fulton.
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来源期刊
Journal of Combinatorics
Journal of Combinatorics MATHEMATICS, APPLIED-
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