Index map, $σ$-connections, and Connes-Chern character in the setting of twisted spectral triples

Abstract: Twisted spectral triples are a twisting of the notion of spectral triple aiming at dealing with some type III geometric situations. In the first part of the paper, we give a geometric construction of the index map of a twisted spectral triple in terms of $\sigma$-connections on finitely generated projective modules. This makes it more transparent the analogy with the indices of Dirac operators with coefficients in vector bundles. In the second part, we give a direct construction of the Connes-Chern character of a twisted spectral, both in the invertible and non-invertible cases. Combining these two parts we obtain an analogue the Atiyah-Singer index formula for twisted spectral triples.