The total surgery obstruction revisited

Abstract

The total surgery obstruction of a finite n-dimensional Poincare complex X is an element s(X) of a certain abelian group Sn (X) with the property that for n >= 5 we have s(X) = 0 if and only if X is homotopy equivalent to a closed n-dimensional topological manifold. The definitions of Sn (X) and s(X) and the property are due to Ranicki in a combination of results of two books and several papers. In this paper we present these definitions and a detailed proof of the main result so that they are in one place and we also add some of the details not explicitly written down in the original sources.