Large deviation principles for pattern-avoiding permutations, and limit shapes for constrained Mallows permutations

Abstract

We study Mallows random permutations conditioned to avoid a given pattern α of length~3. When the bias parameter is of the form eβ/n, we prove that these permutations converge to a non-trivial explicit deterministic permuton that depends on the pattern α and on the parameter β. Along the way, we provide parametrizations for α-avoiding permutons, and establish a large deviation principle for uniform α-avoiding permutations. As a byproduct of the proof, we also obtain asymptotic estimates of two versions of q-Catalan numbers in the regime q=eβ/n.