Abstract A pseudo-Anosov homeomorphism of a surface is a canonical representative of its mapping class. Conditional on the foundations of symplectic field theory, we explain that a transitive pseudo-Anosov flow is similarly a canonical representative of its stable Hamiltonian class. It follows that there are finitely many pseudo-Anosov flows admitting positive Birkhoff sections on any given rational homology 3-sphere. This result has a purely topological consequence: any 3-manifold can be obtained in at most finitely many ways as p / q surgery on a fibered hyperbolic knot in S³ S 3 for a slope p / q satisfying q 6 q ≥ 6, p 0, 1, 2 {\, mod\, }q p ≠ 0, ± 1, ± 2 mod q. The proof of the main theorem generalizes an argument of Barthelmé–Bowden–Mann.
Jonathan Zung (Mon,) studied this question.