On the 3-torsion Part of the Homology of the Chessboard Complex

Abstract

Let 1 m n. We prove various results about the chessboard complex Mm,n, which is the simplicial complex of matchings in the complete bipartite graph Km,n. First, we demonstrate that there is nonvanishing 3-torsion in Hd(Mm,n;Z) whenever m+n-43 d m-4 and whenever 6 m < n and d=m-3. Combining this result with theorems due to Friedman and Hanlon and to Shareshian and Wachs, we characterize all triples (m,n,d) satisfying Hd(Mm,n;Z) ≠ 0. Second, for each k 0, we show that there is a polynomial fk(a,b) of degree 3k such that the dimension of Hk+a+2b-2(Mk+a+3b-1,k+2a+3b-1;Z3), viewed as a vector space over Z3, is at most fk(a,b) for all a 0 and b k+2. Third, we give a computer-free proof that H2(M5,5;Z) Z3. Several proofs are based on a new long exact sequence relating the homology of a certain subcomplex of Mm,n to the homology of Mm-2,n-1 and Mm-2,n-3.