R. Brown, E. J. Moore, T. Porter, C. D. Wensley
abstract:
The category of crossed complexes gives an algebraic model of CW-complexes
and cellular maps. Free crossed resolutions of groups contain information on a
presentation of the group as well as higher homological information. We relate
this to the problem of calculating non-abelian extensions. We show how the
strong properties of this category allow for the computation of free crossed
resolutions for amalgamated sums and HNN-extensions of groups, and so obtain
computations of higher homotopical syzygies in these cases.