Infinite ECH Capacities and Anosov Flows
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Abstract
This article relates the theory of embedded contact homology (ECH) with the dynamics of Anosov flows.
We show that in many cases the ECH capacities of a symplectic 4-manifold are infinite, including cotangent disk bundles over closed oriented surfaces of genus at least two.
We prove that ECH obstructs Reeb Anosov and Hamiltonian Anosov flows, addressing the four-dimensional case of a question posed by Herman in 1998.
Further, we obtain Floer-theoretic obstructions to a 3-manifold admitting any Anosov flow.
As an application, we give new constraints on the existence of embedded Lagrangians of genus at least two in symplectic 4-manifolds.
In an appendix, some related results in all dimensions are proved for capacities constructed from rational symplectic field theory.