A generalization of stirling numbers of the second kind via a special multiset

Martin Griffiths; István Mezo

A generalization of stirling numbers of the second kind via a special multiset

Martin Griffiths, István Mezo

Research output: Contribution to journal › Article › peer-review

Abstract

Stirling numbers of the second kind and Bell numbers are intimately linked through the roles they play in enumerating partitions of n-sets. In a previous article we studied a generalization of the Bell numbers that arose on analyzing partitions of a special multiset. It is only natural, therefore, next to examine the corresponding situation for Stirling numbers of the second kind. In this paper we derive generating functions, formulae and interesting properties of these numbers.

Original language	English
Pages (from-to)	1-23
Number of pages	22
Journal	Journal of Integer Sequences
Volume	13
Issue number	2
Publication status	Published - 2010

Keywords

Bell numbers
Generating functions
Multisets
Partitions
Recurrence relations
Stirling numbers of the second kind

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http://www.cs.uwaterloo.ca/journals/JIS/VOL13/Griffiths/griffiths11.pdf

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title = "A generalization of stirling numbers of the second kind via a special multiset",

abstract = "Stirling numbers of the second kind and Bell numbers are intimately linked through the roles they play in enumerating partitions of n-sets. In a previous article we studied a generalization of the Bell numbers that arose on analyzing partitions of a special multiset. It is only natural, therefore, next to examine the corresponding situation for Stirling numbers of the second kind. In this paper we derive generating functions, formulae and interesting properties of these numbers.",

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AU - Mezo, István

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AB - Stirling numbers of the second kind and Bell numbers are intimately linked through the roles they play in enumerating partitions of n-sets. In a previous article we studied a generalization of the Bell numbers that arose on analyzing partitions of a special multiset. It is only natural, therefore, next to examine the corresponding situation for Stirling numbers of the second kind. In this paper we derive generating functions, formulae and interesting properties of these numbers.

KW - Bell numbers

KW - Generating functions

KW - Multisets

KW - Partitions

KW - Recurrence relations

KW - Stirling numbers of the second kind

M3 - Article

SN - 1530-7638

VL - 13

SP - 1

EP - 23

JO - Journal of Integer Sequences

JF - Journal of Integer Sequences

IS - 2

ER -

A generalization of stirling numbers of the second kind via a special multiset

Abstract

Keywords

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