Lipschitz-homotopy invariants: L2-cohomology, Roe index and ρ-class

In this thesis we talk about lipschitz-homotopy invariants for manifolds of bounded geometry. There are three main results: the first one is the definition of a controvariant functor between the category of manifolds of bounded geometry with uniformly proper lipschitz maps and the category of complex vector space together linear maps. As consequence of this we obtain that the (un)-reduced L2-cohomology is a lipschitz-homotopy invariant. The second result is the invariance of the Roe index of the signature operator under lipschitz-homotopy equivalence which preserves the orientations. Finally, the last result is the following: given a lipschitz-homotopy equivalence wich preserves the orientations between manifold of bounded geometry, we define a ρ-class in the K-theory group of the structure algebra of the codomain which is related to the lipschitz-homotopy. This class only depends on the domain and on the lipschitz-homotopy class of the map.