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An-Khuong Doan: (Formal) moduli problems and equivariant structures

Time: Thu 2022-03-31 10.15 - 11.15

Location: Zoom, meeting ID: 698 8663 6380

Participating: An-Khuong Doan (Jussieu)

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Abstract

It is well-known that any projective variety \(X_0\) admits a formal semi-universal deformation containing all information about its small deformations. In 1980, D. S. Rim proved that if further \(G\) is a linearly reductive group acting algebraically on \(X_0\) then this semi-universal deformation can be equipped with a \(G\)-equivariant structure extending the given \(G\)-action on \(X_0\). In this talk, we first give an example showing that the reductiveness assumption in Rim’s result is really optimal. Next, we prove an analytic version of Rim’s result when \(X_0\) is a complex compact manifold. Finally, we generalize Rim’s result in the framework of derived algebraic geometry.

Belongs to: Stockholm Mathematics Centre
Last changed: Mar 26, 2022