Dax invariants, light bulbs, and isotopies of symplectic structures

Abstract

This paper addresses several isotopy problems on 4-manifolds. First, we classify the isotopy classes of embeddings of in × S2 that are geometrically dual to \pt\× S2, where is a closed oriented surface with a positive genus, and show that there exist infinitely many such embeddings that are homotopic to each other but mutually non-isotopic, thereby answering a question of Gabai. By combining this construction with techniques from symplectic topology, we also answer Problem 2(a) in McDuff-Salamon's problem list and a question of Cieliebak-Eliashberg-Mishachev, which concern the uniqueness and h-principle of symplectic structures on closed 4-manifolds. We answer these questions by establishing the following results: (1) The space of symplectic forms on every irrational ruled surface homologous to a fixed symplectic form has infinitely many connected components; (2) There exist infinitely many symplectic forms on every irrational ruled surface that are formally homotopic, cohomologous, but not homotopic to each other. Both are the first such examples for closed 4-manifolds. The proofs are based on a generalization of the Dax invariant to embedded closed surfaces. In the course of the proof, we obtain several properties of the smooth mapping class group of × S2, which may be of independent interest. For example, we show that there exists a surjective homomorphism from π0Diff(× S2) to Z∞, such that its restriction to the subgroup of elements pseudo-isotopic to the identity is of infinite rank.