On a conjecture on pattern-avoiding machines

Abstract

Let s be West's stack-sorting map, and let sT be the generalized stack-sorting map, where instead of being required to increase, the stack avoids subpermutations that are order-isomorphic to any permutation in the set T. In 2020, Cerbai, Claesson, and Ferrari introduced the σ-machine s sσ as a generalization of West's 2-stack-sorting-map s s. As a further generalization, in 2021, Baril, Cerbai, Khalil, and Vajnovski introduced the (σ, τ)-machine s sσ, τ and enumerated |n(σ,τ)| -- the number of permutations in Sn that are mapped to the identity by the (σ, τ)-machine -- for six pairs of length 3 permutations (σ, τ). In this work, we settle a conjecture by Baril, Cerbai, Khalil, and Vajnovski on the only remaining pair of length 3 patterns (σ, τ) = (132, 321) for which |n(σ, τ)| appears in the OEIS. In addition, we enumerate |n(123, 321)|, which does not appear in the OEIS, but has a simple closed form.