Cylindrical contact homology for weakly convex contact forms in dimension three

Abstract

A contact form λ on a closed contact three-manifold (M,) is called weakly convex if either it has no contractible Reeb orbit, or the first Chern class of vanishes on π2(M), and the index of every contractible Reeb orbit is at least 2. We present conditions for a weakly convex contact form to admit a well-defined cylindrical contact homology. The key point is a cancellation mechanism for boundary degenerations involving index-2 Reeb orbits, based on a parity property of holomorphic planes.

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