English

Eta cocycles

Differential Geometry 2011-02-15 v3 K-Theory and Homology

Abstract

We announce a Godbillon-Vey index formula for longitudinal Dirac operators on a foliated bundle (X,\F)(X,\F) with boundary; in particular, we define a Godbillon-Vey eta invariant on the boundary foliation, that is, a secondary invariant for longitudinal Dirac operators on type III foliations. Our theorem generalizes the classic Atiyah-Patodi-Singer index formula for (X,\F)(X,\F). Moreover, employing the Godbillon-Vey index as a pivotal example, we explain a new approach to higher index theory on geometric structures with boundary. This is heavily based on the interplay between the absolute and relative pairing of KK-theory and cyclic cohomology for an exact sequence of Banach algebras, which in the present context takes the form 0JAB00\to J \to A \to B \to 0 with J dense and holomorphically closed in the C^*-algebra of the foliation and B depending only on boundary data.

Keywords

Cite

@article{arxiv.0907.0173,
  title  = {Eta cocycles},
  author = {Hitoshi Moriyoshi and Paolo Piazza},
  journal= {arXiv preprint arXiv:0907.0173},
  year   = {2011}
}

Comments

Abstract shortened. Sect. 5 modified. References added. Will appear with title "Relative pairings and the APS index formula for the Godbillon-Vey cocycle" in the Contemporary Mathematics volume "Non-commutative Geometry and Global Analysis. Proceedings of the conference in honor of Henri Moscovici". The corresponding complete paper, with proofs, has been posted on the arXiv on February 14 2011

R2 v1 2026-06-21T13:20:08.682Z