Natural transformations relating homotopy and singular homology functors

Abstract

The category of topological spaces endowed with two marked points is equipped with two families Fn and Hn of functors to the category of abelian groups, indexed by a nonnegative integer n: namely, the functor Fn takes the object (X,x,y) to the quotient of Zπ1(X,x,y) by an abelian subgroup associated with the n+1-st power of the augmentation ideal of the group algebra Zπ1(X,x), and the functor Hn takes the same object to the n-th singular homology group of Xn relative to a subspace defined in terms of partial diagonals. We construct a family of natural transformations n : Fn Hn. We identify the natural transformation obtained by restricting n to the subcategory of algebraic varieties with a natural equivalence due to Beilinson.