Exact Sequences for the Homology of the Matching Complex

Abstract

Building on work by Bouc and by Shareshian and Wachs, we provide a toolbox of long exact sequences for the reduced simplicial homology of the matching complex Mn, which is the simplicial complex of matchings in the complete graph Kn. Combining these sequences in different ways, we prove several results about the 3-torsion part of the homology of Mn. First, we demonstrate that there is nonvanishing 3-torsion in Hd(Mn;Z) whenever n d (n-6/2, where n= (n-4)/3 . By results due to Bouc and to Shareshian and Wachs, H_n(Mn;Z) is a nontrivial elementary 3-group for almost all n and the bottom nonvanishing homology group of Mn for all n ≠ 2. Second, we prove that Hd(Mn;Z) is a nontrivial 3-group whenever n d (2n-9)/5. Third, for each k 0, we show that there is a polynomial fk(r) of degree 3k such that the dimension of Hk-1+r(M2k+1+3r;Z3), viewed as a vector space over Z3, is at most fk(r) for all r k+2.