A formula for the Möbius function of the permutation poset based on a topological decomposition
Smith, Jason P. (2015) A formula for the Möbius function of the permutation poset based on a topological decomposition. Preprint / Working Paper. arXiv.org. (http://arxiv.org/abs/1506.04406)
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We present a two term formula for the Möbius function of intervals in the poset of all permutations, ordered by pattern containment. The first term in this formula is the number of so called normal occurrences of one permutation in another. Our definition of normal occurrences is similar to those that have appeared in several variations in the literature on the Möbius function of this and other posets, but simpler than most of them. The second term in the formula is complicated, but we conjecture that it equals zero for a significant proportion of intervals. We present some cases where the second term vanishes and others where it is nonzero. Computing the Möbius function recursively from its definition has exponential complexity, whereas the computation of the first term in our formula is polynomial and the exponential part is isolated to the second term, which seems to often vanish. We also present a new result on the Möbius function of posets connected by a poset fibration related to a result of Björner, Wachs and Welker.
ORCID iDs
Smith, Jason P. ORCID: https://orcid.org/0000000242091604;

Item type: Monograph(Preprint / Working Paper) ID code: 55011 Dates: DateEvent14 June 2015PublishedKeywords: Möbius function, posets, permutations, pattern containment, combinatorics, Mathematics, Computational Mathematics, Discrete Mathematics and Combinatorics Subjects: Science > Mathematics Department: Faculty of Science > Computer and Information Sciences Depositing user: Pure Administrator Date deposited: 11 Dec 2015 05:13 Last modified: 31 Aug 2022 18:51 URI: https://strathprints.strath.ac.uk/id/eprint/55011