Contact de Rham cohomology and Hodge structures transversal to the Reeb foliations

Abstract

Let β be a contact form on a compact smooth manifold X and vβ its Reeb vector field. The paper applies general results of different authors about Hodge structures that are transversal to a given foliation to the special case of 1-dimensional foliation generated by the Reeb flow vβ. The de Rham differential complex basic(X, vβ) of, so called, basic relative to vβ-flow differential forms is in the focus of this investigation. By definition, the basic forms vanish when being contracted with vβ, and so do their differentials. We prove that under the change β β1 = β +df, where a function f:X R such that df(vβ) > -1, the differential complexes basic(X, vβ1) and basic(X, vβ) are canonically isomorphic. We investigate when the 2-form dβ and its powers deliver nontrivial elements in the basic de Rham cohomology Hbasic\,dR(X, vβ) of the differential complex basic(X, vβ). Answers to these questions contrast sharply in the cases of a closed X and a X with boundary. On the other hand, building on work of Ra\'zny Raz, we show that on a closed manifold X, equipped with a transversal to the Reeb flow Hodge structure that satisfies the Basic Hard Lefschetz Property, the basic de Rham cohomology Hbasic\,dR(X, vβ) are topological invariants of X.

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