【115/4/30】16:20-17:10 Dr. Norton Lee (Institute for Basic Science - Center for Geometry and Physics)
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| Time | 2026-4-30 16:20-17:10 |
| Venue | 31106, Department of Mathematics |
| Speaker | Dr. Norton Lee (Institute for Basic Science - Center for Geometry and Physics) |
| Title | Cluster Integrable Systems on a Chessboard and Their Quantization |
| Abstract | Goncharov and Kenyon prove that any Newton polygon, modulo an SA(2,\mathbb{Z}) action, defines an integrable system, known as dimer integrable system. The conserving Hamiltonians are represented by cycles on a bipartite graph on a torus. Moreover, the integrable system has an X-cluster structure where the mutation corresponds to specific modification on the graph. I will give an introduction on the dimer integrable system and their quantization. |
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