Baxter d-permutations and other pattern avoiding classes

Abstract

A permutation of size n can be identified to its diagram in which there is exactly one point per row and column in the grid [n]2. In this paper we consider multidimensional permutations (or d-permutations), which are identified to their diagrams on the grid [n]d in which there is exactly one point per hyperplane xi=j for i∈[d] and j∈[n]. We first investigate exhaustively all small pattern avoiding classes. We provide some bijection to enumerate some of these classes and we propose some conjectures for others. We then give a generalization of well-studied Baxter permutations into this multidimensional setting. In addition, we provide a vincular pattern avoidance characterization of Baxter d-permutations.