一类高阶斯特林数的组合方法

Pub Date : 2021-09-27 DOI:10.1556/012.2021.58.3.1500

T. Komatsu, J. L. Ramírez, Diego Villamizar

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引用次数: 8

摘要

在本文中，我们研究了一类经典斯特林数的推广，考虑了元组上具有环的最小元素附加条件的置换。这项工作的主要重点是分析这些新对象的组合特性。给出了一般的组合恒等式和一些递归关系。我们还展示了与其他序列的一些联系，如具有更高层次的聚柯西数和中心阶乘数。为了得到我们的结果，我们使用了纯组合参数和形式幂级数的经典操作。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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A Combinatorial Approach to the Stirling Numbers of the First Kind with Higher Level

In this paper, we investigate a generalization of the classical Stirling numbers of the first kind by considering permutations over tuples with an extra condition on the minimal elements of the cycles. The main focus of this work is the analysis of combinatorial properties of these new objects. We give general combinatorial identities and some recurrence relations. We also show some connections with other sequences such as poly-Cauchy numbers with higher level and central factorial numbers. To obtain our results, we use pure combinatorial arguments and classical manipulations of formal power series.

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