The Moebius function of separable and decomposable permutations
Abstract
We give a recursive formula for the Moebius function of an interval in the poset of permutations ordered by pattern containment in the case where is a decomposable permutation, that is, consists of two blocks where the first one contains all the letters 1, 2, ..., k for some k. This leads to many special cases of more explicit formulas. It also gives rise to a computationally efficient formula for the Moebius function in the case where and are separable permutations. A permutation is separable if it can be generated from the permutation 1 by successive sums and skew sums or, equivalently, if it avoids the patterns 2413 and 3142. A consequence of the formula is that the Moebius function of such an interval is bounded by the number of occurrences of as a pattern in . We also show that for any separable permutation the Moebius function of is either 0, 1 or -1.
Keywords
Cite
@article{arxiv.1102.1611,
title = {The Moebius function of separable and decomposable permutations},
author = {Alexander Burstein and Vit Jelinek and Eva Jelinkova and Einar Steingrimsson},
journal= {arXiv preprint arXiv:1102.1611},
year = {2011}
}
Comments
20 pages, 2 figures