Free resolutions and Koszul homology

n 1 we give an explicit resolution of k-algebras for which x , . . . , x is strongly n 1 proper. This resolution has the same structure as that of the Eliahou᎐Kervaire resolution but also applies to certain algebras defined by binomial relations. As a demonstration of the theorem we compute the Ž

We prove that every compactum X, having rational dimension n, is an image under a rationally acyclic map of an As a consequence we obtain existence of rational homology k-manifolds with covering dimension greater than k.

Projective resolutions of modules over a ring R are constructed starting from appropriate projective resolutions over a ring Q mapping to R. It is shown that such resolutions may be chosen to be minimal in codimension F 2, but not in codimension 3. This is used to obtain minimal resolutions for esse