Miller Spaces and Spherical Resolvability of Finite Complexes
arXiv:math/0111151
Abstract
We show that if $K$ is a nilpotent finite complex, then $ΩK$ can be built from spheres using fibrations and homotopy (inverse) limits. This is applied to show that if ${\mathrm {map}}_*(X,S^n)$ is weakly contractible for all $n$, then ${\mathrm {map}}_*(X,K)$ is weakly contractible for any nilpotent finite complex $K$.
9 pages