| Speaker: | Hiraku Nakajima (Kavli IPMU) |
|---|---|
| Title: | Coulomb branches of symmetrizable quiver gauge theories |
| Date (JST): | Thu, Mar 07, 2019, 15:30 - 17:00 |
| Place: | Seminar Room A |
| Abstract: |
Coulomb branches of 3d N=4 SUSY quiver gauge theories for type ADE were affine Grassmannian slices or their generalization for the corresponding ADE group. Slices for BCFG groups were realized as fixed point subschemes under diagram automorphisms, but they a priori do not share nice properties of Coulomb branches. I propose a new definition, motivated by works of Geiss, Leclerc, Schroer. The new Coulomb branches are slices for BCFG groups in finite type, and have the normality, existences of integrable systems, quantization, and various nice properties. It also suggest a new way to look for the corresponding Higgs branchs, which should be considered as quiver varieties for symmetrizable Cartan matrices. This is a joint work with Alex Weekes. |
| Remarks: | Blackboard talk |
