EL-Shellability of the poset of ranked cactuses

Abstract

Recently the poset of ranked cactuses (P(X),) was introduced. For a finite set X, this poset consists of a set P(X) of certain collections of ordered pairs of subsets of X together with an ordering that is similar to the refinement ordering of partitions of a finite set. In addition, the maximal chains in this poset correspond to binary ranked cactuses, a fact which can be used to construct the so-called space of equidistant cactuses. In this paper, we show that the poset of ranked cactuses is EL-shellable. As a consequence we also show that the proper part of the link of the origin of the space of equidistant cactuses has the homotopy type of a wedge of spheres.