The probability of avoiding consecutive patterns in the Mallows distribution
Abstract
We use various combinatorial and probabilistic techniques to study growth rates for the probability that a random permutation from the Mallows distribution avoids consecutive patterns. The Mallows distribution behaves like a -analogue of the uniform distribution by weighting each permutation by , where is the number of inversions in and is a positive, real-valued parameter. We prove that the growth rate exists for all patterns and all , and we generalize Goulden and Jackson's cluster method to keep track of the number of inversions in permutations avoiding a given consecutive pattern. Using singularity analysis, we approximate the growth rates for length-3 patterns, monotone patterns, and non-overlapping patterns starting with 1, and we compare growth rates between different patterns. We also use Stein's method to show that, under certain assumptions on , the length of , and , the number of occurrences of a given pattern is well approximated by the normal distribution.
Cite
@article{arxiv.1609.01370,
title = {The probability of avoiding consecutive patterns in the Mallows distribution},
author = {Harry Crane and Stephen DeSalvo and Sergi Elizalde},
journal= {arXiv preprint arXiv:1609.01370},
year = {2016}
}
Comments
34 pages, 12 figures