Title of article
Some set partition statistics in non-crossing partitions and generating functions Original Research Article
Author/Authors
Fujine Yano، نويسنده , , Hiroaki Yoshida، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2007
Pages
14
From page
3147
To page
3160
Abstract
In this paper we shall give the generating functions for the enumeration of non-crossing partitions according to some set partition statistics explicitly, which are based on whether a block is singleton or not and is inner or outer. Using weighted Motzkin paths, we find the continued fraction form of the generating functions. There are bijections between non-crossing partitions, Dyck paths and non-nesting partitions, hence we can find applications in the enumeration of Dyck paths and non-nesting partitions. We shall also study the integral representation of the enumerating polynomials for our statistics. As an application of integral representation, we shall give some remarks on the enumeration of inner singletons in non-crossing partitions, which is equivalent to one of uduʹs at high level in Dyck paths investigated in [Y. Sun, The statistic “number of uduʹs” in Dyck paths, Discrete Math. 284 (2004) 177–186].
Keywords
Non-crossing partitions , Generating functions , Continued fractions , Dyck paths , Non-nesting partitions , Set partition statistics
Journal title
Discrete Mathematics
Serial Year
2007
Journal title
Discrete Mathematics
Record number
947650
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