Year 2024
| Seminario Matematico e Fisico di Milano |
| François Delarue Université Côte d'Azur Mean field control and games. Some prospects
Thursday, April 18 2024, at 14:00 aula U5 RATIO-3014 Dip di Matematica e Applicazioni - Università Milano - Bicocca |
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| Seminario Matematico e Fisico di Milano |
| Corinna Ulcigrai Institut für Mathematik - Universität Zürich Periodic surfaces and deterministic random walks: dynamics between geometry and probability
Thursday, March 21 2024, at 14:30 aula U5 RATIO-3014 Università Milano - Bicocca |
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| Seminario Matematico e Fisico di Milano |
| Marc Levine Universität Duisburg-Essen DT invariants of smooth projective threefolds: classical, quadratic and real
Wednesday, February 21 2024, at 17:00 Sala di Rappresentanza del Dipartimento di Matematica di via Saldini |
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| Seminario Matematico e Fisico di Milano |
| Jiri Neustupa Czech Academy of Sciences, Institute of Mathematics, Prague On steady solutions to the MHD equations with inhomogeneous generalized impermeability boundary conditions for the magnetic field
Monday, February 19 2024, at 11:30 Sala di Rappresentanza del Dipartimento di Matematica di via Saldini | |
| Seminario Matematico e Fisico di Milano |
| Alexander Kuznetsov Steklov Institute, Mosca Categorical resolutions and categorical absorptions of singularities
Thursday, January 18 2024, at 16:30 Aula 8, Dipartimento di Matematica, via Saldini |
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Abstract
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A resolution of singularities of a singular algebraic variety is a proper morphism from a smooth algebraic variety which induces an isomorphism of dense open subsets. An old but extremely important theorem of Hironaka proves that, over a field of characteristic zero, any algebraic variety admits a resolution.
Similarly, an absorption of singularities of a singular algebraic variety is a proper morphism to a smooth algebraic variety which induces an isomorphism of dense open subsets. In contrast to resolution, existence of absorption is a very rare phenomenon.
I will talk about a categorical version of resolution and absorption of singularities, give some examples, and try to demonstrate how useful these notions are.
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