Complex Symplectic Contractions and 3d Mirrors

Andrew Dancer; Julius F. Grimminger; Johan Martens; Zhenghao Zhong

arXiv:2406.09626·hep-th·November 26, 2024

Complex Symplectic Contractions and 3d Mirrors

Andrew Dancer, Julius F. Grimminger, Johan Martens, Zhenghao Zhong

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TL;DR

This paper introduces magnetic quivers for complex-symplectic contraction spaces, linking them to implosions and the Moore-Tachikawa category, and employs 3D mirror symmetry for validation.

Contribution

It presents a novel construction of magnetic quivers for complex-symplectic contractions and utilizes 3D mirror symmetry for computational verification.

Findings

01

Magnetic quivers for complex-symplectic contraction spaces are constructed.

02

3D mirror symmetry provides effective computational checks.

03

Connections to Moore-Tachikawa category are established.

Abstract

We propose magnetic quivers for the complex-symplectic contraction spaces, which are related to implosions and have a natural interpretation in terms of the Moore-Tachikawa category. We use 3-d mirrors to provide computational checks.

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Taxonomy

TopicsMathematics and Applications · Material Science and Thermodynamics