Combinatorial Reeb dynamics on punctured contact 3-manifolds

Abstract

Let = + - ⊂ (R3, std) be a contact surgery diagram determining a closed, connected contact 3-manifold (S3, ) and an open contact manifold (R3, ). Following arXiv:0911.0026 and arXiv:1906.07228 we demonstrate how determines a family αε of contact forms on (R3, ) whose closed Reeb orbits are in one-to-one correspondence with cyclic words of composable Reeb chords on . We compute the homology classes and integral Conley-Zehnder indices of these orbits diagrammatically and develop algebraic tools for studying holomorphic curves in surgery cobordisms between the (R3, ). These new techniques are used to describe the first known examples of closed, tight contact manifolds with vanishing contact homology. They are contact 1k surgeries along the right-handed, tb=1 trefoil for k > 0, which are known to have non-zero Heegaard-Floer contact classes by arXiv:math/0404135.