Lim colim versus colim lim. I

Abstract

We study a model situation in which direct limit (colim) and inverse limit () do not commute, and offer some computations of their "commutator". The homology of a separable metrizable space X has two well-known approximants: qHn(X) ("Cech homology") and pHn(X) ("Cech homology with compact supports"), which are not homology theories but are nevertheless interesting as they are and colim applied to homology of finite simplicial complexes. The homomorphism τX: pHn(X) qHn(X), which is a special case of the natural map colim, need not be either injective (P. S. Alexandrov, 1947) or surjective (E. F. Mishchenko, 1953), but its surjectivity for locally compact X remains an open problem. In the case n=0 we obtain an affirmative solution of this problem. For locally compact X, the dual map in cohomology pHn(X) qHn(X) is shown to be surjective and its kernel is computed, in terms of 1 and a new functor 1fg. The original map τX is surjective and its kernel is computed when X is a "coronated polyhedron", i.e. contains a compactum whose complement is a polyhedron.