Posets of annular non-crossing partitions of types B and D

Abstract

We study the set (p,q) of annular non-crossing permutations of type B, and we introduce a corresponding set (p,q) of annular non-crossing partitions of type B, where p and q are two positive integers. We prove that the natural bijection between (p,q) and (p,q) is a poset isomorphism, where the partial order on (p,q) is induced from the hyperoctahedral group Bp+q, while (p,q) is partially ordered by reverse refinement. In the case when q=1, we prove that (p,1) is a lattice with respect to reverse refinement order. We point out that an analogous development can be pursued in type D, where one gets a canonical isomorphism between (p,q) and (p,q). For q=1, the poset (p,1) coincides with a poset ``NC(D) (p+1)'' constructed in a paper by Athanasiadis and Reiner in 2004, and is a lattice by the results of that paper.