Permutations with a Given X-Descent Set

Abstract

Building on the work of Grinberg and Stanley, we begin a systematic study of permutations with a prescribed X-descent set. In particular, for a set X ⊂eq N2, and I ⊂eq [n-1], we study the permutations π ∈ Sn whose X-descent set is precisely I, meaning (πi,πi+1) ∈ X precisely when i ∈ I. The central focus is enumerating these permutations for a fixed X,I and n: this count is denoted by dX(I;n). We derive a recursion which under expected conditions simplifies to a binomial-type recurrence determined entirely by the values dX(;n). This extends the work of D\'iaz-Lopez et al.\ on descent polynomials. The resulting reduction shows that the general statistic dX(I;n) is typically governed by the ``descent-free'' quantities dX(;n), motivating a closer analysis of these numbers. We observe that dX(;n) enumerates Hamiltonian paths in a directed graph canonically associated to X. We then record several families of sets X for which dX(;n) is explicit or effectively computable. This includes families with periodicity for which transfer matrix methods apply, and families with succession-type relations where inclusion-exclusion applies. We then investigate the typical behavior of dX(;n) from a probabilistic perspective.