Generic properties of $3$-dimensional Reeb flows: Birkhoff sections and entropy

Abstract: In this paper we use broken book decompositions to study Reeb flows on closed 3-manifolds. We show that if the Liouville measure of a nondegenerate contact form can be approximated by periodic orbits, then there is a Birkhoff section for the associated Reeb flow. In view of Irie's equidistribution theorem, this is shown to imply that the set of contact forms whose Reeb flows have a Birkhoff section contains an open and dense set in the C ∞ -topology. We also show that the set of contact forms whose Reeb flows … Show more

“…The aim of this section is to generalize the main results of [12] and [13,14], from Reeb vector fields of a contact form to Reeb vector fields of a SHS. Broken book decompositions, introduced in [12] (consult Definition 5.7), provide a strong tool for studying the dynamics of a vector field.…”

“…Colin, Dehornoy, Hryniewicz, and the second author in [13] and Contreras and Mazzuchelli in [14], established independently that the set of Reeb vector field of contact structures admitting a Birkhoff section contains an open and dense set in C ∞ -topology. In analogy, our main result is Theorem 1.1.…”

“…If dλ is a constant non-zero multiple of ω, then the SHS provides the same information as λ, which is a contact form. Since we will extend results from [12,13], we are concerned with the case in which dλ is a non-constant multiple of ω (hence the set {dλ = 0} can be a non-empty proper subset of the ambient manifold). In this case, Cieliebak and Volkov's Structure Theorem [10] (Theorem 2.2), establishes a way to cut the manifold along invariant tori.…”

“…If we assume that f is non-constant, in the contact parts of M (confer Section 2.1), the results in [12] and [14,13] imply the existence of a broken book decomposition or a Birkhoff section (both adapted to have boundary) respectively. Theorems 1.1 and 1.2 are proved by pasting either enough leaves of a broken book decomposition or a Birkhoff section of the contact parts of M with the sections that the flow has in the suspension parts.…”

Periodic orbits and Birkhoff sections of stable Hamiltonian structures

“…The aim of this section is to generalize the main results of [12] and [13,14], from Reeb vector fields of a contact form to Reeb vector fields of a SHS. Broken book decompositions, introduced in [12] (consult Definition 5.7), provide a strong tool for studying the dynamics of a vector field.…”

“…Colin, Dehornoy, Hryniewicz, and the second author in [13] and Contreras and Mazzuchelli in [14], established independently that the set of Reeb vector field of contact structures admitting a Birkhoff section contains an open and dense set in C ∞ -topology. In analogy, our main result is Theorem 1.1.…”

“…If dλ is a constant non-zero multiple of ω, then the SHS provides the same information as λ, which is a contact form. Since we will extend results from [12,13], we are concerned with the case in which dλ is a non-constant multiple of ω (hence the set {dλ = 0} can be a non-empty proper subset of the ambient manifold). In this case, Cieliebak and Volkov's Structure Theorem [10] (Theorem 2.2), establishes a way to cut the manifold along invariant tori.…”

“…If we assume that f is non-constant, in the contact parts of M (confer Section 2.1), the results in [12] and [14,13] imply the existence of a broken book decomposition or a Birkhoff section (both adapted to have boundary) respectively. Theorems 1.1 and 1.2 are proved by pasting either enough leaves of a broken book decomposition or a Birkhoff section of the contact parts of M with the sections that the flow has in the suspension parts.…”

Periodic orbits and Birkhoff sections of stable Hamiltonian structures

“…It is not known whether this latter condition holds for a C ∞ generic Riemannian metric on a closed surface; indeed, even the fact that, for such a C ∞ generic Riemannian metric, the lifts of the closed geodesics form a dense subset of the unit tangent bundle is an open problem. Nevertheless, Irie's equidistribution theorem [Iri21] implies that the contact volume form can be approximated by periodic orbits for a C ∞ generic contact form on any closed 3-manifold, and together with [CDHR22] this provides an alternative proof of the C ∞ generic existence of Birkhoff sections for closed contact 3-manifolds.…”

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