From Seiberg-Witten to Gromov: MCE and Singular Symplectic Forms

Abstract

Motivated by various possible generalizations of Taubes's \(SW=Gr\) theorem [T] to Floer-theoretic setting, we prove certain variants of Taubes's convergence theorem in T (the first part of his proof of \(SW=Gr\)). In place of the closed symplectic 4-manifold considered in [T], this article considers non-compact manifolds with cylindrical ends, equipped with a self-dual harmonic 2-form with non-degenerate zeroes. This extends and simplifies some central technical ingredients of the author's prior work in [LT] and [KLT5]. Other expected applications include: extending the \(HM=PFH\) theorem in [T] and the \(HM=HF\) theorem in [KLT1]-[KLT5] to TQFTs on both sides [L1]; definitions of large-perturbation Seiberg-Witten analogs of Heegaard Floer theory's link Floer homologies and link cobordism invariants.

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