Stack-sorting simplices: geometry and lattice-point enumeration

Abstract

We initiate the study of subpolytopes of the permutahedron that arise as the convex hulls of stack-sorting on permutations. We primarily focus on Ln1 permutations, i.e., permutations of length n whose penultimate and last entries are n and 1, respectively. First, we present some enumerative results on Ln1 permutations. Then we show that the polytopes that arise from stack-sorting on Ln1 permutations are simplices and proceed to study their geometry and lattice-point enumeration. In addition, we pose questions and problems for further investigation. Particular focus is then taken on the Ln1 permutation 23·s n1. We show that the convex hull of all its iterations through the stack-sorting algorithm shares the same lattice-point enumerator as that of the (n-1)-dimensional unit cube and lecture-hall simplex. Lastly, we detail some results on the real lattice-point enumerator for variations of the simplices arising from stack-sorting on the permutation 23·s n1. This then allows us to show that those simplices are Gorenstein of index 2.