Let X be a closed smooth manifold of dimension n. We call two homotopy equivalences from closed manifolds of dimension to equivalent if there exists a cobordism together with a mapsuch that, and are homotopy equivalences. The structure set is the set of equivalence classes of homotopy equivalences from closed manifolds of dimension n to X. This set has a preferred base point:. There is also a version which takes Whitehead torsion into account. If we require in the definition above the homotopy equivalences F, and to be simple homotopy equivalences then we obtain the simple structure set.
Remarks
Notice that in the definition of resp. is an h-cobordism resp. an s-cobordism. Using the s-cobordism theorem we obtain another description for the simple structure set, provided that n>4: The simple structure set is the set of equivalence classes of homotopy equivalences from closed manifolds of dimension n to X with respect to the following equivalence relation. Two homotopy equivalences are equivalent if there exists a diffeomorphism such that is homotopic to. As long as we are dealing with differential manifolds, there is in general no canonical group structure on. If we deal with topological manifolds, it is possible to endow with a preferred structure of an abelian group. Notice that a manifold M is diffeomorphic to a closed manifold X if and only if there exists a simple homotopy equivalence whose equivalence class is the base point in. Some care is necessary because it may be possible that a given simple homotopy equivalence is not homotopic to a diffeomorphism although M and X are diffeomorphic. Therefore, it is also necessary to study the operation of the group of homotopy classes of simple self-equivalences of X on. The basic tool to compute the simple structure set is the surgery exact sequence.
Examples
Topological Spheres: The generalized Poincaré conjecture in the topological category says that only consists of the base point. This conjecture was proved by Smale, Freedman and Perelman. Exotic Spheres: The classification of exotic spheres by Kervaire and Milnor gives for n > 4.