More Torsion in the Homology of the Matching Complex

Abstract

A matching on a set X is a collection of pairwise disjoint subsets of X of size two. Using computers, we analyze the integral homology of the matching complex Mn, which is the simplicial complex of matchings on the set \1, >..., n\. The main result is the detection of elements of order p in the homology for p ∈ \5,7,11,13\. Specifically, we show that there are elements of order 5 in the homology of Mn for n 18 and for n ∈ 14,16. The only previously known value was n = 14, and in this particular case we have a new computer-free proof. Moreover, we show that there are elements of order 7 in the homology of Mn for all odd n between 23 and 41 and for n=30. In addition, there are elements of order 11 in the homology of M47 and elements of order 13 in the homology of M62. Finally, we compute the ranks of the Sylow 3- and 5-subgroups of the torsion part of Hd(Mn;Z) for 13 n 16; a complete description of the homology already exists for n 12. To prove the results, we use a representation-theoretic approach, examining subcomplexes of the chain complex of Mn obtained by letting certain groups act on the chain complex.