Browsing by Author "Suter, Aiden"
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Item Mathematical Aspects of Higgs & Coulomb Branches(University of Waterloo, 2024-08-21) Suter, AidenThis thesis contains results pertaining to different aspects of the 3d mirror symmetry between Higgs and Coulomb branches. In Chapter 2 we verify the 3d A-model Higgs branch conjecture formulated in [BF23] for SQED with n > 3 hypermultiplets. The conjecture claims that the associated variety of the boundary VOA for the 3d A-model is isomorphic to the Higgs branch of the physical theory. We demonstrate that the boundary VOA is L1(psl(n|n)) and show that its associated variety is the closure of the minimal nilpotent orbit, verifying the conjecture. In Chapter 3 we build on the work of [Web19a; Web22] by explicitly constructing a tilting generator for the derived category of coherent sheaves on T∗Gr(2, 4). This variety is the Coulomb branch for a quiver gauge theory and has functions described by a KRLW algebra. We achieve this result by constructing generators for modules over this diagrammatic algebra and identifying the coherent sheaves these correspond to.