Mapping analytic surgery to homology, higher rho numbers and metrics of positive scalar curvature

Abstract

Let be a f.g. discrete group and let M be a Galois -covering of a smooth closed manifold M. Let S*(M) be the analytic structure group, appearing in the Higson-Roe analytic surgery sequence S*( M) K*(M) K*(Cr*). We prove that for an arbitrary discrete group it is possible to map the whole Higson-Roe sequence to the long exact sequence of even/odd-graded noncommutative de Rham homology H[*-1](A) Hdel[*-1](A) He[*](A), with A a dense homomorphically closed subalgebra of C*r. Here, H*del(A) is the delocalized homology and H*e(A) is the homology localized at the identity element. Then, under additional assumptions on , we prove the existence of a pairing between HC*del(C), the delocalized part of the cyclic cohomology of C, and Hdel*-1(A). This, in particular, gives a pairing between S*( M) and HC*-1del(C). We also prove the existence of a pairing between S*( M) and the relative cohomology H[*-1](M B). Both these parings are compatible with known pairings associated with the other terms in the Higson-Roe sequence. In particular, we define higher rho numbers associated to the rho class ( D)∈ S*( M) of an invertible -equivariant Dirac type operator on M. Finally, we provide a precise study for the behavior of all previous K-theoretic and homological objects and of the higher rho numbers under the action of the diffeomorphism group of M. Then, we establish new results on the moduli space of metrics of positive scalar curvature when M is spin.