Controlled homotopy equivalences and structure sets of manifolds

Abstract

For a closed topological n--manifold K and a map p:K B inducing an isomorphism π1(K)π1(B), there is a canonicaly defined morphism b:Hn+1(B,K,L) S (K), where L is the periodic simply-connected surgery spectrum and S (K) is the topological structure set. We construct a refinement a:Hn+1+(B,K,L ) S ,δ (K) in the case when p is UV1, and we show that a is bijective if B is a finite-dimensional compact metric ANR. Here, Hn+1+(B,K,L )⊂ Hn+1(B,K,L ), and S ,δ (K) is the controlled structure set. We show that the Pedersen-Quinn-Ranicki controlled surgery sequence is equivalent to the exact L-homology sequence of the map p:K B, i.e. that Hn+1(B,L) Hn+1+(B,K,L ) Hn(K,L+) Hn(B,L ), \ L+ L, is the connected covering spectrum of L. By taking for B various stages of the Postnikov tower of K, one obtains an interesting filtration of the controlled structure set.