Overview
Explore a 47-minute lecture by Dr Rémi Reboulet from Chalmers University of Technology examining the non-Archimedean interpretations of K-stability in algebraic geometry. Delve into how K-stability serves as an algebro-geometric concept potentially characterizing the existence of canonical metrics on complex projective varieties. Learn about the valuative criteria in studying K-stability of Fano varieties and understand the significance of non-Archimedean tools in this field. Discover the motivation behind the recently introduced concept of divisorial stability by Boucksom-Jonsson, presented as part of the New Equivariant Methods in Algebraic and Differential Geometry seminar series at the Isaac Newton Institute.
Syllabus
EMG | Dr Rémi Reboulet | Non-Archimedean aspects of K-stability
Taught by
INI Seminar Room 2