The Partial Partition Complex

Abstract

The set of partial partitions of \1,…,n\, ordered by containment, forms an abstract simplicial complex Dn whose vertices are the nonempty subsets of \1,…,n\ and whose simplices are collections of pairwise disjoint subsets. We prove that Dn is vertex-decomposable, give an explicit nonpure shelling, and use it to compute the reduced homology: for 1 j n, the homology in dimension j-1 is free abelian of rank equal to the number of partitions of \1,…,n\ into j blocks containing no singleton blocks. Explicit generators are constructed as boundary complexes of j-dimensional cross-polytopes, one for each non-singleton partition. We also prove that the automorphism group of Dn is the symmetric group on n letters.