Adiabatic groupoid and secondary invariants in K-theory

“…In [11, Section 5] Piazza and Schick construct a map from the Stolz exact sequence to the Higson-Roe exact sequence (see also [20,23] for different approaches). Instead of working with complex C * -algebras as in [11], one can without extra effort adapt this construction to the setting of real C * -algebras (compare [22]).…”

Positive Scalar Curvature due to the Cokernel of the Classifying Map

“…In [11, Section 5] Piazza and Schick construct a map from the Stolz exact sequence to the Higson-Roe exact sequence (see also [20,23] for different approaches). Instead of working with complex C * -algebras as in [11], one can without extra effort adapt this construction to the setting of real C * -algebras (compare [22]).…”

Positive Scalar Curvature due to the Cokernel of the Classifying Map

“…In [15, Section 5] Piazza and Schick construct a map from the Stolz exact sequence to the Higson-Roe exact sequence (see also [24,27] for different approaches). Instead of working with complex C * -algebras as in [15], one can without extra effort adapt this construction to the setting of real C * -algebras (compare [26]).…”

Positive Scalar Curvature due to the Cokernel of the Classifying Map

“…We introduce next a secondary invariant which encodes information in K-theory about the structure of a given compatible metric of positive scalar curvature. See also [52] where secondary invariants are introduced that control the vanishing of the generalized index defined via the adiabatic groupoid, instead of the Fredholm index defined via the Fredholm groupoid. Consider first the following general setup: Let A, B be separable C * -algebras.…”

Getzler rescaling via adiabatic deformation and a renormalized index formula