Simultaneous Z/p-acyclic resolutions of expanding sequences

Abstract

We prove the following Theorem: Let X be a nonempty compact metrizable space, let l1 ≤ l2 ≤... be a sequence of natural numbers, and let X1 ⊂ X2 ⊂... be a sequence of nonempty closed subspaces of X such that for each k in N, dimZ/p Xk ≤ lk < ∞. Then there exists a compact metrizable space Z, having closed subspaces Z1 ⊂ Z2 ⊂..., and a surjective cell-like map π: Z X, such that for each k in N, (a) dim Zk ≤ lk, (b) π (Zk) = Xk, and (c) π | Zk: Zk Xk is a Z/p-acyclic map. Moreover, there is a sequence A1 ⊂ A2 ⊂... of closed subspaces of Z, such that for each k, dim Ak ≤ lk, π|Ak: Ak X is surjective, and for k in N, Zk⊂ Ak and π|Ak: Ak X is a UVlk-1-map. It is not required that X be the union of all Xk, nor that Z be the union of all Zk. This result generalizes the Z/p-resolution theorem of A. Dranishnikov, and runs parallel to a similar theorem of S. Ageev, R. Jim\'enez, and L. Rubin, who studied the situation where the group was Z.