A New CR Invariant for Contact 3-Manifolds and Classes of Open Books

Abstract

This paper introduces a new CR invariant for co-oriented contact structures on closed, orientable 3-manifolds. The invariant, which we denote as μM(ξ), takes values in the Picard group of complex line bundles (M). The construction associates to a contact structure ξ and a supporting open book decomposition an embedding into 3, where the contact structure becomes the holomorphic line field along the binding. Using Stein theory, the induced holomorphic line bundle extends to all of 3 but we consider only its restriction to M. By Giroux's correspondence, we prove this construction is independent of the choice of open book, yielding a well-defined invariant μM(ξ) ∈ (M) over the manifold. As an application, we distinguish two tight contact structures on the 3-torus 3 by showing their first Chern classes are different.