On contact invariants in bordered Floer homology

Abstract

In this paper, we define contact invariants in bordered sutured Floer homology. Given a contact 3-manifold with convex boundary, we apply a result of Zarev (arxiv:1010.3496) to derive contact invariants in the bordered sutured modules BSA and BSD, as well as in bimodules BSAA, BSDD, BSDA in the case of two boundary components. In the connected boundary case, our invariants appear to agree with bordered contact invariants defined by Alishahi-F\"oldv\'ari-Hendricks-Licata-Petkova-V\'ertesi (arxiv:2011.08672) whenever the latter are defined, although ours can be defined in broader contexts. We prove that these invariants satisfy a pairing theorem, which is a bordered extension of the Honda-Kazez-Mati\'c gluing map (arxiv:0705.2828) for sutured Floer homology. We also show that there is a correspondence between certain A∞ operations in bordered type-A modules and bypass attachment maps in sutured Floer homology. As an application, we characterize the Stipsicz-V\'ertesi map from SFH to HFK as an A∞ action on CFA. We also apply the immersed curve interpretation of Hanselman-Rasmussen-Watson (arxiv:1604.03466) to prove results involving contact surgery.

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