On the compactness problem for a family of generalized Seiberg–Witten equations in dimension 3

Thomas Walpuski; Boyu Zhang

doi:10.1215/00127094-2021-0005

Abstract

We prove an abstract compactness theorem for a family of generalized Seiberg–Witten equations in dimension 3. This result recovers Taubes’s compactness theorem for stable flat $\mathbf{P}{\mathrm{SL}_{2}}(\mathbf{C})$ -connections as well as the compactness theorem for Seiberg–Witten equations with multiple spinors by Haydys and Walpuski. Furthermore, this result implies a compactness theorem for the ${\mathrm{ADHM}_{1,2}}$ Seiberg–Witten equation, which partially verifies a conjecture by Doan and Walpuski.

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Thomas Walpuski. Boyu Zhang. "On the compactness problem for a family of generalized Seiberg–Witten equations in dimension 3." Duke Math. J. 170 (17) 3891 - 3934, 15 November 2021. https://doi.org/10.1215/00127094-2021-0005

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Received: 6 June 2019; Revised: 2 September 2020; Published: 15 November 2021

First available in Project Euclid: 18 November 2021

MathSciNet: MR4340726

zbMATH: 1500.53030

Digital Object Identifier: 10.1215/00127094-2021-0005

Subjects:

Primary: 53C07

Secondary: 35J70 , 57R57

Keywords: compactness , Gauge Theory , generalized Seiberg–Witten equations , geometric analysis

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