Carlitz, Scoville和Vaughan的结果通过偏序集的同调的q-类似

Q3 Mathematics

Algebraic Combinatorics Pub Date : 2023-05-03 DOI:10.5802/alco.265

Yifei Li

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引用次数: 0

摘要

让f (z) = P∞n = 0 n (n−1)z / n !n !。在1975年的这篇文章,Carlitz是97万,沃恩provided a combinatorial境coefficients电源的解析》系列1 - f (z) = z P∞n = 0ωn n / n !n !。他们proved thatωn算数of副of permutations当家》n th symmetric集团S n与普通ascent号。这篇文章给a combinatorial解释of a自然q -analogue of top homology》ωn: studying Segre广告《眼泪lattice B n (q)和不由自主。我们也derive an equation就是analogous to a well-known symmetric功能身份:P n i = 0(−1)我e h n−i = 0,哪种然后我们generalizes q -analogue to a symmetric集团representation论点。

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A q-analogue of a result of Carlitz, Scoville and Vaughan via the homology of posets

Let f ( z ) = P ∞ n =0 ( − 1) n z n /n ! n !. In their 1975 paper, Carlitz, Scoville and Vaughan provided a combinatorial interpretation of the coefficients in the power series 1 /f ( z ) = P ∞ n =0 ω n z n /n ! n !. They proved that ω n counts the number of pairs of permutations of the n th symmetric group S n with no common ascent. This paper gives a combinatorial interpretation of a natural q -analogue of ω n by studying the top homology of the Segre product of the subspace lattice B n ( q ) with itself. We also derive an equation that is analogous to a well-known symmetric function identity: P n i =0 ( − 1) i e i h n − i = 0, which then generalizes our q -analogue to a symmetric group representation result.

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来源期刊

Algebraic Combinatorics Mathematics-Discrete Mathematics and Combinatorics

CiteScore

1.30

自引率

0.00%

发文量

审稿时长

51 weeks