Journal of Integer Sequences, Vol. 13 (2010), Article 10.3.3

m-Partition Boards and Poly-Stirling Numbers


Brian K. Miceli
Department of Mathematics
Trinity University
One Trinity Place
San Antonio, TX 78212-7200
USA

Abstract:

We define a generalization of the Stirling numbers of the first and second kinds and develop a new rook theory model to give combinatorial interpretations to these numbers. These rook-theoretic interpretations are used to give a direct combinatorial proof that two associated matrices are inverses of each other. We also give combinatorial interpretations of the numbers in terms of certain collections of permutations and in terms of certain collections of set partitions. In addition, many other well-known identities involving Stirling numbers are generalized using this new model.


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Received September 8 2009; revised version received February 26 2010. Published in Journal of Integer Sequences, February 26 2010.


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