Ordered Partitions Avoiding a Permutation of Length 3
Abstract
An ordered partition of is a partition whose blocks are endowed with a linear order. Let be set of ordered partitions of with blocks and be set of ordered partitions in that avoid a pattern . Recently, Godbole, Goyt, Herdan and Pudwell obtained formulas for the number of ordered partitions of with 3 blocks and the number of ordered partitions of with blocks avoiding a permutation pattern of length 3. They showed that for any permutation of length 3, and raised the question concerning the enumeration of . They also conjectured that the number of ordered partitions of with blocks of size 2 avoiding a permutation pattern of length 3 satisfied a second order linear recurrence relation. In answer to the question of Godbole, et al., we obtain the generating function for and we prove the conjecture on the recurrence relation.
Cite
@article{arxiv.1304.3187,
title = {Ordered Partitions Avoiding a Permutation of Length 3},
author = {William Y. C. Chen and Alvin Y. L. Dai and Robin D. P. Zhou},
journal= {arXiv preprint arXiv:1304.3187},
year = {2013}
}
Comments
12 pages