Clustering of consecutive numbers in permutations avoiding a pattern of length three or avoiding a finite number of simple patterns
Abstract
For η∈ S3, let Snav(η) denote the set of permutations in Sn that avoid the pattern η, and let Enav(η) denote the expectation with respect to the uniform probability measure on Snav(η). For n k2 and τ∈ Skav(η), let Nn(k)(σ) denote the number of occurrences of k consecutive numbers appearing in k consecutive positions in σ∈ Snav(η), and let Nn(k;τ)(σ) denote the number of such occurrences for which the order of the appearance of the k numbers is the pattern τ. We obtain explicit formulas for Enav(η)Nn(k;τ) and Enav(η)Nn(k), for all 2 k n, all η∈ S3 and all τ∈ Skav(η). These exact formulas then yield asymptotic formulas as n∞ with k fixed, and as n∞ with k=kn∞. We also obtain analogous results for Snav(η1,·s,ηr), the subset of Sn consisting of permutations avoiding the patterns \τi\i=1r, where τi∈ Smi, in the case that \τi\i=1n are all simple permutations. A particular case of this is the set of separable permutations, which corresponds to r=2, τ1=2413,τ2=3142.
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