Contact structures on open 3-manifolds

Abstract

In this paper, we study contact structures on any open 3-manifold V which is the interior of a compact 3-manifold. To do this, we introduce proper contact isotopy invariants called the slope at infinity and the division number at infinity. We first prove several classification theorems for T2 x [0, ∞), T2 x R, and S1 x R2 using these concepts. This investigation yields infinitely many tight contact structures on T2 x [0,∞), T2 x R, and S1 x R2 which admit no precompact embedding into another tight contact structure on the same space. Finally, we show that if V is irreducible and has an end of nonzero genus, then there are uncountably many tight contact structures on V that are not contactomorphic, yet are isotopic. Similarly, there are uncountably many overtwisted contact structures on V that are not contactomorphic, yet are isotopic.

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