Contact topology and CR geometry in three dimensions

Abstract

We study low-dimensional problems in topology and geometry via a study of contact and Cauchy-Riemann (CR) structures. A contact structure is called spherical if it admits a compatible spherical CR structure. We will talk about spherical contact structures and our analytic tool, an evolution equation of CR structures. We argue that solving such an equation for the standard contact 3-sphere is related to the Smale conjecture in 3-topology. Furthermore, we propose a contact analogue of Ray-Singer's analytic torsion. This ''contact torsion'' is expected to be able to distinguish among ''spherical space forms'' \ S3\ as contact manifolds. We also propose the study of a certain kind of monopole equation associated with a contact structure. In view of the recently developed theory of contact homology algebras, we will discuss its overall impact on our study.

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