Stability conditions, scattering diagrams and cluster algebras 3
Ponente: Lang Mou
Institución: University of California, Davis
Tipo de Evento: Investigación, Formación de Recursos Humanos
Institución: University of California, Davis
Tipo de Evento: Investigación, Formación de Recursos Humanos
Cuándo |
18/09/2019 de 16:30 a 18:00 |
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Dónde | Salón 1 de seminarios |
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Cluster algebras associated to quivers are additively categorified by categories modeled on quiver representations. Stability conditions and scattering diagrams of these categories are remarkably linked with the corresponding cluster algebras. I will first introduce scattering diagrams valued in graded Lie algebras in full generality and explain Kontsevich-Soibelman’s classification theorem. A canonical cone complex structure of a scattering diagram will be given. Then I will define Bridgeland’s stability scattering diagrams associated to quiver with potentials and explain how they can be used to study the corresponding cluster algebras.