Contact Ozsvath-Szabo Invariants and Giroux Torsion
Abstract
In this paper we prove a vanishing theorem for the contact Ozsvath--Szabo invariants of certain contact 3--manifolds having positive Giroux torsion. We use this result to establish similar vanishing results for contact structures with underlying 3--manifolds admitting either a torus fibration over the circle or a Seifert fibration over an orientable base. We also show -- using standard techniques from contact topology -- that if a contact 3--manifold (Y,) has positive Giroux torsion then there exists a Stein cobordism from (Y,) to a contact 3--manifold (Y,') such that (Y,) is obtained from (Y,') by a Lutz modification.
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