Abstract: The workshop will bring together internationally renowned researchers working on various topics related to the theory and applications of SPDEs, to exchange the latest results and generate novel ideas for research directions and applications.
Abstract: Good moduli space maps are generally far from separated. However for many purposes they behave as if they are proper maps. In this talk I will explain two recent results in this direction (joint with Elmanto, Satriano and Inchiostro, Satriano respectively) 1) that a universal family exists over a proper generically finite covering of the good moduli space, and 2) that the good moduli space map satisfies a strong version of the existence part of the valuative criterion of properness. Along the way I will explain several structural results about good moduli spaces and especially gerbes.
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