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1. Detection of Echinococcus spp. and other taeniid species in lettuces and berries: Two international multicenter studies from the MEmE project

Author

Umhang, Gérald, Bastien, Fanny, Cartet, Alexandra, Ahmad, Haroon, van der Ark, Kees, Berg, Rebecca, Bonelli, Piero, Davidson, Rebecca K., Deplazes, Peter, Deksne, Gunita, Gargate, Maria João, Van der Giessen, Joke, Jamil, Naila, Jokelainen, Pikka, Karamon, Jacek, M'Rad, Selim, Maksimov, Pavlo, Oudni-M'Rad, Myriam, Muchaamba, Gillian, Oksanen, Antti, Pepe, Paola, Poulle, Marie-Lazarine, Rinaldi, Laura, Samorek-Pieróg, Małgorzata, Santolamazza, Federica, Santoro, Azzurra, Santucciu, Cinzia, Saarma, Urmas, Schnyder, Manuela, Villena, Isabelle, Wassermann, Marion, Casulli, Adriano, and Boué, Franck

Published
2025
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2. Detection of Echinococcus spp. and other taeniid species in lettuces and berries: two international multicenter studies from the MEmE project

Author

Umhang, Gerald, primary, Bastien, Fanny, additional, Cartet, Alexandra, additional, Ahmad, Haroon, additional, van der Ark, Kees, additional, Berg, Rebecca, additional, Bonelli, Piero, additional, Davidson, Rebecca K., additional, Deplazes, Peter, additional, Deksne, Gunita, additional, Gargate, Maria Joao, additional, Van der Giessen, Joke, additional, Jamil, Naila, additional, Jokelainen, Pikka, additional, Karamon, Jacek, additional, MRad, Selim, additional, Maksimov, Pavlo, additional, Oudni-MRad, Myriam, additional, Muchaamba, Gillian, additional, Oksanen, Antti, additional, Pepe, Paola, additional, Poulle, Marie-Lazarine, additional, Rinaldi, Laura, additional, Samorek-Pierog, Margorzata, additional, Santolamazza, Federica, additional, Santoro, Azzurra, additional, Santucciu, Cinzia, additional, Saarma, Urmas, additional, Schnyder, Manuela, additional, Villena, Isabelle, additional, Wassermann, Marion, additional, Casulli, Adriano, additional, and Boue, Franck, additional

Published
2024
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5. J. Wang - Topological rigidity and positive scalar curvature

Author

Wang, Jian, Béchet, Hugo, Bastien, Fanny, and Bastien, Fanny

Subjects
curvature constraints and spaces of metrics, positive scalar, contraintes de courbures et espaces métriques, grenoble, eem2021, topological rigidity, Mathematics::Differential Geometry, [MATH] Mathematics [math]
Abstract

In this talk, we shall describe some topological rigidity and its relationship with positive scalar curvature. Precisely, we will present a proof that a complete contractible 3-manifold with positive scalar curvature is homeomorphic to the Euclidean 3-space. We will furthermore explain the interplay between, minimal surfaces, scalar curvature and the topology at infinity.

Published
2021

6. C. Sormani - Intrinsic Flat and Gromov-Hausdorff Convergence 3

Author

Sormani, Christina, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
intrinsic flat, curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, eem2021, [MATH] Mathematics [math], Gromov-Hausdorff convergence
Abstract

We introduce various notions of convergence of Riemannian manifolds and metric spaces. We then survey results and open questions concerning the limits of sequences of Riemannian manifolds with uniform lower bounds on their scalar curvature. We close the course by presenting methods and theorems that may be applied to prove these open questions including older techniques developed with Lakzian, with Huang and Lee, and with Portegies. I will also present key new results of Allen and Perales. Students and postdocs interested in working on these problems will be formed into teams. For a complete list of papers about intrinsic flat convergence see: https://sites.google.com/site/intrinsicflatconvergence/

Published
2021

7. A. Mondino - Metric measure spaces satisfying Ricci curvature lower bounds 2

Author

Mondino, Andrea, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
Ricci curvature, curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, Mathematics::Metric Geometry, eem2021, Mathematics::Differential Geometry, [MATH] Mathematics [math]
Abstract

The idea of compactifying the space of Riemannian manifolds satisfying Ricci curvature lower bounds goes back to Gromov in the '80ies and was pushed by Cheeger-Colding in the ‘90ies, who investigated the structure of spaces arising as Gromov-Hausdorff limits of smooth Riemannian manifolds satisfying Ricci curvature lower bounds. A completely new approach based on Optimal Transport was proposed by Lott-Villani and Sturm around ten years ago; via this approach, one can give a precise sense of what means for a non-smooth space (more precisely for a metric measure space) to satisfy a Ricci curvature lower bound and a dimensional upper bound. This approach has been refined in the last years by a number of authors (most notably Ambrosio-Gigli- Savarè) and a number of fundamental tools have now been established, permitting to give further insights in the theory and applications which are new even for smooth Riemannian manifolds. The goal of the lectures is to give an introduction to the theory and discuss some of the applications.

Published
2021

8. A. Mondino - Metric measure spaces satisfying Ricci curvature lower bounds 3

Author

Mondino, Andrea, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
Ricci curvature, curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, Mathematics::Metric Geometry, eem2021, Mathematics::Differential Geometry, [MATH] Mathematics [math]
Abstract

The idea of compactifying the space of Riemannian manifolds satisfying Ricci curvature lower bounds goes back to Gromov in the '80ies and was pushed by Cheeger-Colding in the ‘90ies, who investigated the structure of spaces arising as Gromov-Hausdorff limits of smooth Riemannian manifolds satisfying Ricci curvature lower bounds. A completely new approach based on Optimal Transport was proposed by Lott-Villani and Sturm around ten years ago; via this approach, one can give a precise sense of what means for a non-smooth space (more precisely for a metric measure space) to satisfy a Ricci curvature lower bound and a dimensional upper bound. This approach has been refined in the last years by a number of authors (most notably Ambrosio-Gigli- Savarè) and a number of fundamental tools have now been established, permitting to give further insights in the theory and applications which are new even for smooth Riemannian manifolds. The goal of the lectures is to give an introduction to the theory and discuss some of the applications.

Published
2021

9. Limites de courbures de Ricci temporelles via transport optimal

Author

Mondino, Andrea, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
Ricci curvature, optimal transport, curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, eem2021, [MATH] Mathematics [math]
Abstract

The goal of the talk is to present a recent work in collaboration with Cavalletti (SISSA) on optimal transport in Lorentzian synthetic spaces. The aim is to set up a “Lorentzian analog” of the celebrated Lott-Sturm-Villani theory of CD(K,N) metric measure spaces. The key idea being to analyse convexity properties of Entropy functionals along future directed timelike geodesics (with respect to a suitable Lorentzian Wasserstein distance) of probability measures. The smooth Lorentzian setting was previously investigated by McCann and Mondino-Suhr.After recalling the general setting of Lorentzian synthetic spaces (including remarkable examples fitting the framework), I will discuss some basics of optimal transport theory thereof in order to define "timelike Ricci curvature bounded below and dimension bounded above'' for a (possibly non-smooth) Lorentzian space. The notion of "timelike Ricci curvature bounded below and dimension bounded above'' for a (possibly non-smooth) Lorentzian space is stable under a suitable weak convergence of Lorentzian synthetic spaces, giving a glimpse on the strength of the proposed approach.As an application of the optimal transport approach to timelike Ricci curvature lower bounds, I will discuss an extension of the Hawking's Singularity Theorem (in sharp form) to the synthetic setting.

Published
2021

10. T. Richard - Advanced basics of Riemannian geometry 3

Author

Richard, Thomas, Bastien, Fanny, Béchet, Hugo, Bastien, Fanny, Université Paris-Est Créteil Val-de-Marne - Paris 12 (UPEC UP12), Institut Fourier (IF), and Centre National de la Recherche Scientifique (CNRS)-Université Grenoble Alpes (UGA)

Subjects
curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, Mathematics::Metric Geometry, eem2021, Mathematics::Differential Geometry, [MATH] Mathematics [math], [MATH]Mathematics [math], Riemannian geometry
Abstract

We will present some of the tools used by the more advanced lectures. The topics discussed will include : Gromov Hausdorff distance, comparison theorems for sectional and Ricci curvature, the Bochner formula and basics of Ricci flow.

Published
2021

11. F. Schulze - An introduction to weak mean curvature flow 1

Author

Schulze, Felix, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
Physics::Fluid Dynamics, curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, eem2021, [MATH] Mathematics [math], weak mean curvature flow
Abstract

It has become clear in recent years that to understand mean curvature flow through singularities it is essential to work with weak solutions to mean curvature flow. We will give a brief introduction to smooth mean curvature flow and then discuss Brakke flows, their basic properties and how to establish existence via elliptic regularization. We will furthermore discuss tangent flows and regularity, and the interaction of Brakke flows with the level set flow. Time permitting, we will give an outlook on recent developments, including the proof of the mean convex neighborhood conjecture by Choi-Haslhofer-Hershkovits/Choi-Haslhofer-Hershkovits-White as well as progress towards establishing the existence of generic mean curvature flow.

Published
2021

12. F. Schulze - An introduction to weak mean curvature flow 4

Author

Schulze, Felix, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
Physics::Fluid Dynamics, curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, weak mean curvature, eem2021, [MATH] Mathematics [math]
Abstract

It has become clear in recent years that to understand mean curvature flow through singularities it is essential to work with weak solutions to mean curvature flow. We will give a brief introduction to smooth mean curvature flow and then discuss Brakke flows, their basic properties and how to establish existence via elliptic regularization. We will furthermore discuss tangent flows and regularity, and the interaction of Brakke flows with the level set flow. Time permitting, we will give an outlook on recent developments, including the proof of the mean convex neighborhood conjecture by Choi-Haslhofer-Hershkovits/Choi-Haslhofer-Hershkovits-White as well as progress towards establishing the existence of generic mean curvature flow.

Published
2021

13. D. Tewodrose - Limits of Riemannian manifolds satisfying a uniform Kato condition

Author

Tewodrose, David, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
Riemannian manifolds, curvature constraints and spaces of metrics, Kato condition, contraintes de courbures et espaces métriques, Mathematics::Metric Geometry, eem2021, Mathematics::Differential Geometry, [MATH] Mathematics [math], Grenoble
Abstract

I will present a joint work with G. Carron and I. Mondello where we study Kato limit spaces. These are metric measure spaces obtained as Gromov-Hausdorff limits of smooth n-dimensional Riemannian manifolds with Ricci curvature satisfying a uniform Kato-type condition. In this context, strictly wider than the ones of Ricci limit spaces (where the Ricci curvature satisfies a uniform lower bound) and Lp-Ricci limit spaces (where the Ricci curvature is uniformly bounded in Lp for some p>n/2), we extend classical results of Cheeger, Colding and Naber, like the fact that under a non-collapsing assumption, every tangent cone is a metric measure cone. I will present these results and explain how we rely upon a new heat-kernel based almost monotone quantity to derive them.

Published
2021

14. M. Lesourd - Positive Scalar Curvature on Noncompact Manifolds and the Positive Mass Theorem

Author

Lesourd, Martin, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
noncompact manifolds, positive scalar, curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, positive mass theorem, eem2021, Mathematics::Differential Geometry, [MATH] Mathematics [math], Mathematics::Symplectic Geometry
Abstract

The study of positive scalar curvature on noncompact manifolds has seen significant progress in the last few years. A major role has been played by Gromov's results and conjectures, and in particular the idea to use surfaces of prescribed mean curvature (as opposed to minimal surfaces). Having the classic positive mass theorem of Schoen-Yau in mind, we describe a new positive mass theorem for manifolds that allows for possibly non asymptotically flat ends, points of incompleteness, and regions negative scalar curvature. The proof is based on surfaces with prescribed mean curvature, and gives an alternative proof of the Liouville theorem conjectured by Schoen-Yau, which was recently proved by Chodosh-Li. This is joint with R.Unger and S-T. Yau.

Published
2021

15. T. Ozuch - Noncollapsed degeneration and desingularization of Einstein 4-manifolds

Author

Ozuch, Tristan, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, eem2021, Einstein 4-manifolds, [MATH] Mathematics [math]
Abstract

We study the noncollapsed singularity formation of Einstein 4-manifolds. We prove that any smooth Einstein 4-manifold close to a singular one in a mere Gromov-Hausdorff (GH) sense is the result of a gluing-perturbation procedure that we develop. This sheds light on the structure of the moduli space of Einstein 4-manifolds near its boundary and lets us show that spherical and hyperbolic orbifolds (which are synthetic Einstein spaces) cannot be GH-approximated by smooth Einstein metrics. New obstructions specific to the compact situation moreover raise the question of whether or not a sequence of Einstein 4-manifolds degenerating while bubbling out gravitational instantons has to be Kähler-Einstein.

Published
2021

16. École d’été 2021 - Contraintes de courbures et espaces métriques

Author

Richard, Thomas, Bastien, Fanny, Béchet, Hugo, Bastien, Fanny, Université Paris-Est Créteil Val-de-Marne - Paris 12 (UPEC UP12), Institut Fourier (IF), and Centre National de la Recherche Scientifique (CNRS)-Université Grenoble Alpes (UGA)

Subjects
curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, eem2021, [MATH] Mathematics [math], [MATH]Mathematics [math], Riemannian geometry
Published
2021

17. A. Mondino - Metric measure spaces satisfying Ricci curvature lower bounds 1

Author

Mondino, Andrea, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
Ricci curvature, curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, Mathematics::Metric Geometry, eem2021, Mathematics::Differential Geometry, [MATH] Mathematics [math]
Abstract

The idea of compactifying the space of Riemannian manifolds satisfying Ricci curvature lower bounds goes back to Gromov in the '80ies and was pushed by Cheeger-Colding in the ‘90ies, who investigated the structure of spaces arising as Gromov-Hausdorff limits of smooth Riemannian manifolds satisfying Ricci curvature lower bounds. A completely new approach based on Optimal Transport was proposed by Lott-Villani and Sturm around ten years ago; via this approach, one can give a precise sense of what means for a non-smooth space (more precisely for a metric measure space) to satisfy a Ricci curvature lower bound and a dimensional upper bound. This approach has been refined in the last years by a number of authors (most notably Ambrosio-Gigli- Savarè) and a number of fundamental tools have now been established, permitting to give further insights in the theory and applications which are new even for smooth Riemannian manifolds. The goal of the lectures is to give an introduction to the theory and discuss some of the applications.

Published
2021

18. F. Schulze - An introduction to weak mean curvature flow 2

Author

Schulze, Felix, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
Physics::Fluid Dynamics, curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, eem2021, [MATH] Mathematics [math], weak mean curvature flow
Abstract

It has become clear in recent years that to understand mean curvature flow through singularities it is essential to work with weak solutions to mean curvature flow. We will give a brief introduction to smooth mean curvature flow and then discuss Brakke flows, their basic properties and how to establish existence via elliptic regularization. We will furthermore discuss tangent flows and regularity, and the interaction of Brakke flows with the level set flow. Time permitting, we will give an outlook on recent developments, including the proof of the mean convex neighborhood conjecture by Choi-Haslhofer-Hershkovits/Choi-Haslhofer-Hershkovits-White as well as progress towards establishing the existence of generic mean curvature flow.

Published
2021

19. A. Mondino - Metric measure spaces satisfying Ricci curvature lower bounds 4

Author

Mondino, Andrea, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
Ricci curvature, curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, metric measure, eem2021, [MATH] Mathematics [math]
Abstract

The idea of compactifying the space of Riemannian manifolds satisfying Ricci curvature lower bounds goes back to Gromov in the '80ies and was pushed by Cheeger-Colding in the ‘90ies, who investigated the structure of spaces arising as Gromov-Hausdorff limits of smooth Riemannian manifolds satisfying Ricci curvature lower bounds. A completely new approach based on Optimal Transport was proposed by Lott-Villani and Sturm around ten years ago; via this approach, one can give a precise sense of what means for a non-smooth space (more precisely for a metric measure space) to satisfy a Ricci curvature lower bound and a dimensional upper bound. This approach has been refined in the last years by a number of authors (most notably Ambrosio-Gigli- Savarè) and a number of fundamental tools have now been established, permitting to give further insights in the theory and applications which are new even for smooth Riemannian manifolds. The goal of the lectures is to give an introduction to the theory and discuss some of the applications.

Published
2021

20. J. Fine - Knots, minimal surfaces and J-holomorphic curves

Author

Fine, Joël, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
curves, curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, minimal surface, knots, eem2021, J-holomorphic, [MATH] Mathematics [math], Mathematics::Symplectic Geometry, Mathematics::Geometric Topology
Abstract

I will describe work in progress, parts of which are joint with Marcelo Alves. Let L be a knot or link in the 3-sphere. I will explain how one can count minimal surfaces in hyperbolic 4-space which have ideal boundary equal to L, and in this way obtain a knot invariant. In other words the number of minimal surfaces doesn’t depend on the isotopy class of the link. These counts of minimal surfaces can be organised into a two-variable polynomial which is perhaps a known polynomial invariant of the link, such as HOMFLYPT.“Counting minimal surfaces” needs to be interpreted carefully here, similar to how Gromov-Witten invariants “count” J-holomorphic curves. Indeed I will explain how this “minimal surface polynomial" can be seen as a Gromov-Witten invariant for the twistor space of hyperbolic 4-space. This leads naturally to a new class of infinite-volume 6-dimensional symplectic manifolds with well behaved counts of J-holomorphic curves. This gives more potential knot invariants, for knots in 3-manifolds other than the 3-sphere. It also enables the counting of minimal surfaces in more general Riemannian 4-manifolds, besides hyperbolic space.

Published
2021

21. D. Stern - Harmonic map methods in spectral geometry

Author

Stern, Daniel L., Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, eem2021, [MATH] Mathematics [math], Mathematics::Spectral Theory, spectral geometry, harmonic map
Abstract

Over the last fifty years, the problem of finding sharp upper bounds for area-normalized Laplacian eigenvalues on closed surfaces has attracted the attention of many geometers, due in part to connections to the study of sphere-valued harmonic maps and minimal immersions. In this talk, I'll describe a series of results which shed new light on this problem by relating it to the variational theory of the Dirichlet energy on sphere-valued maps. Recent applications include new (H^{-1}-)stability results for the maximization of the first and second Laplacian eigenvalues, and a proof that metrics maximizing the first Steklov eigenvalue on a surface of genus g and k boundary components limit to the \lambda_1-maximizing metric on the closed surface of genus g as k becomes large (in particular, the associated free boundary minimal surfaces in B^{N+1} converge as varifolds to the associated closed minimal surface in S^N). Based on joint works with Mikhail Karpukhin, Mickael Nahon and Iosif Polterovich.

Published
2021

22. F. Schulze - Mean curvature flow with generic initial data

Author

Bastien, Fanny, Béchet, Hugo, Schulze, Felix, and Bastien, Fanny

Subjects
mean curvature flow, curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, initial data, eem2021, [MATH] Mathematics [math]
Abstract

Mean curvature flow is the gradient flow of the area functional and constitutes a natural geometric heat equation on the space of hypersurfaces in an ambient Riemannian manifold. It is believed, similar to Ricci Flow in the intrinsic setting, to have the potential to serve as a tool to approach several fundamental conjectures in geometry. The obstacle for these applications is that the flow develops singularities, which one in general might not be able to classify completely. Nevertheless, a well-known conjecture of Huisken states that a generic mean curvature flow should have only spherical and cylindrical singularities. As a first step in this direction Colding-Minicozzi have shown in fundamental work that spheres and cylinders are the only linearly stable singularity models. As a second step toward Huisken's conjecture we show that mean curvature flow of generic initial closed surfaces in R^3 avoids asymptotically conical and non-spherical compact singularities. The main technical ingredient is a long-time existence and uniqueness result for ancient mean curvature flows that lie on one side of asymptotically conical or compact self-similarly shrinking solutions. This is joint work with Otis Chodosh, Kyeongsu Choi and Christos Mantoulidis.

Published
2021

23. C. Sormani - Intrinsic Flat and Gromov-Hausdorff Convergence 4

Author

Sormani, Christina, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
intrinsic flat, curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, eem2021, [MATH] Mathematics [math], Gromov-Hausdorff convergence
Abstract

We introduce various notions of convergence of Riemannian manifolds and metric spaces. We then survey results and open questions concerning the limits of sequences of Riemannian manifolds with uniform lower bounds on their scalar curvature. We close the course by presenting methods and theorems that may be applied to prove these open questions including older techniques developed with Lakzian, with Huang and Lee, and with Portegies. I will also present key new results of Allen and Perales. Students and postdocs interested in working on these problems will be formed into teams. For a complete list of papers about intrinsic flat convergence see: https://sites.google.com/site/intrinsicflatconvergence/

Published
2021

24. F. Schulze - An introduction to weak mean curvature flow 3

Author

Schulze, Felix, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
Physics::Fluid Dynamics, curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, eem2021, [MATH] Mathematics [math], weak mean curvature flow
Abstract

It has become clear in recent years that to understand mean curvature flow through singularities it is essential to work with weak solutions to mean curvature flow. We will give a brief introduction to smooth mean curvature flow and then discuss Brakke flows, their basic properties and how to establish existence via elliptic regularization. We will furthermore discuss tangent flows and regularity, and the interaction of Brakke flows with the level set flow. Time permitting, we will give an outlook on recent developments, including the proof of the mean convex neighborhood conjecture by Choi-Haslhofer-Hershkovits/Choi-Haslhofer-Hershkovits-White as well as progress towards establishing the existence of generic mean curvature flow.

Published
2021

25. T. Richard - Advanced basics of Riemannian geometry 1

Author

Richard, Thomas, Bastien, Fanny, Béchet, Hugo, Bastien, Fanny, Université Paris-Est Créteil Val-de-Marne - Paris 12 (UPEC UP12), Institut Fourier (IF), and Centre National de la Recherche Scientifique (CNRS)-Université Grenoble Alpes (UGA)

Subjects
curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, Mathematics::Metric Geometry, eem2021, Mathematics::Differential Geometry, [MATH] Mathematics [math], [MATH]Mathematics [math], Riemannian geometry
Abstract

We will present some of the tools used by the more advanced lectures. The topics discussed will include : Gromov Hausdorff distance, comparison theorems for sectional and Ricci curvature, the Bochner formula and basics of Ricci flow.

Published
2021

26. Régularité et stabilité des frontières sous les bornes inférieures de Ricci

Author

Semola, Daniele, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, lower Ricci bounds, eem2021, [MATH] Mathematics [math]
Abstract

Summer school 2021. The theory of non smooth spaces with lower Ricci Curvature bounds has undergone huge developments in the last thirty years. On the one hand the impetus came from Gromov’s precompactness theorem and the Cheeger-Colding theory of Ricci limit spaces. On the other hand “synthetic” theories of lower Ricci bounds have been developed, based on semigroup tools (the Bakry-Émery theory) and on Optimal Transport (the Lott-Sturm-Villani theory).The Cheeger-Colding theory did not consider manifolds with boundary, while in the synthetic framework even understanding what is a good definition of boundary is a challenge.The aim of this talk is to present some recent results obtained in collaboration with E. Bruè (IAS, Princeton) and A. Naber (Northwestern University) about regularity and stability for boundaries of spaces with lower Ricci Curvature bounds.

Published
2021

27. C. Sormani - Intrinsic Flat and Gromov-Hausdorff Convergence 1

Author

Sormani, Christina, Bastien, Fanny, Béchet, Hugo, and Bastien, Fanny

Subjects
intrinsic flat, curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, Gromov-Hausdorff, eem2021, Mathematics::Differential Geometry, [MATH] Mathematics [math]
Abstract

We introduce various notions of convergence of Riemannian manifolds and metric spaces. We then survey results and open questions concerning the limits of sequences of Riemannian manifolds with uniform lower bounds on their scalar curvature. We close the course by presenting methods and theorems that may be applied to prove these open questions including older techniques developed with Lakzian, with Huang and Lee, and with Portegies. I will also present key new results of Allen and Perales. Students and postdocs interested in working on these problems will be formed into teams. For a complete list of papers about intrinsic flat convergence see: https://sites.google.com/site/intrinsicflatconvergence/

Published
2021

28. T. Richard - Advanced basics of Riemannian geometry 2

Author

Richard, Thomas, Bastien, Fanny, Béchet, Hugo, Bastien, Fanny, Université Paris-Est Créteil Val-de-Marne - Paris 12 (UPEC UP12), Institut Fourier (IF), and Centre National de la Recherche Scientifique (CNRS)-Université Grenoble Alpes (UGA)

Subjects
curvature constraints and spaces of metrics, contraintes de courbures et espaces métriques, grenoble, Mathematics::Metric Geometry, eem2021, Mathematics::Differential Geometry, [MATH] Mathematics [math], [MATH]Mathematics [math], Riemannian geometry
Abstract

We will present some of the tools used by the more advanced lectures. The topics discussed will include : Gromov Hausdorff distance, comparison theorems for sectional and Ricci curvature, the Bochner formula and basics of Ricci flow.

Published
2021

29. Blue mussel ( Mytilus edulis )—A bioindicator of marine water contamination by protozoa: Laboratory and in situ approaches

Author

Bigot‐Clivot, Aurélie, primary, La Carbona, Stéphanie, additional, Cazeaux, Catherine, additional, Durand, Loïc, additional, Géba, Elodie, additional, Le Foll, Frank, additional, Xuereb, Benoit, additional, Chalghmi, Houssem, additional, Dubey, Jitender P., additional, Bastien, Fanny, additional, Bonnard, Isabelle, additional, Palos Ladeiro, Mélissa, additional, Escotte‐Binet, Sandie, additional, Aubert, Dominique, additional, Villena, Isabelle, additional, and Geffard, Alain, additional

Published
2021
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31. E. Amerik - On the characteristic foliation

Author

Amerik, Ekaterina, Bastien, Fanny, Humphries, Donovan, and Bastien, Fanny

Subjects
Feuilletages et géométrie algébrique, eem2019, Foliations and algebraic geometry, Mathematics::Complex Variables, Mathematics::Differential Geometry, [MATH] Mathematics [math], Mathematics::Symplectic Geometry, characteristic foliations, Grenoble
Abstract

Let X be a holomorphic symplectic manifold and D a smooth hypersurface in X. Then the restriction of the symplectic form on D has one-dimensional kernel at each point. This distribution is called the characteristic foliation. I shall survey a few results concerning the possible Zariski closure of a general leaf of this foliation by myself and Campana, myself and my former student L. Guseva, and more recently by my student R. Abugaliev.

Published
2019

32. J.-V. Pereira - Algebraic leaves of codimension one foliations (Part 4)

Author

Pereira, Jorge Vitorio, Bastien, Fanny, Humphries, Donovan, and Bastien, Fanny

Subjects
Feuilletages et géométrie algébrique, eem2019, Foliations and algebraic geometry, codimension one, Mathematics::Differential Geometry, [MATH] Mathematics [math], algebraic leaves, Grenoble
Abstract

This mini-course will review old and new results about algebraic leaves of codimension one foliations on projective manifolds. I will discuss some of the following topics: Darboux's Theorem and generalizations; compact leaves; holonomy of an algebraic leaf; and effective algebraic integration (a.k.a. Poincaré and Painlevé problems).

Published
2019

33. E. Floris - Birational geometry of foliations on surfaces (Part 3)

Author

Floris, Enrica, Bastien, Fanny, Humphries, Donovan, and Bastien, Fanny

Subjects
Feuilletages et géométrie algébrique, Mathematics::Algebraic Geometry, Mathematics::Dynamical Systems, eem2019, Foliations and algebraic geometry, Mathematics::Differential Geometry, [MATH] Mathematics [math], surfaces, Mathematics::Symplectic Geometry, birational geometry, Grenoble
Abstract

The goal of this minicourse is to introduce MMP for foliations on surfaces and to outline the classification of foliations on projective surfaces up to birational equivalence.

Published
2019

34. J.-M. Martell - A minicourse on Harmonic measure and Rectifiability (Part 2)

Author

José Maria, Martell, Bastien, Fanny, and Bastien, Fanny

Subjects
UGA, CNRS, rectifiability, harmonic measure, [MATH] Mathematics [math], Rencontres du GDR AFHP 2019, institut fourier, Grenoble
Abstract

Solving the Dirichlet boundary value problem for an elliptic operator amounts to study the good properties of the associated elliptic measure. In the context of domains having an Ahlfors regular boundary and satisfying theso-called interior corkscrew and Harnack chain conditions (these are respectively scale invariant/quantitative versions of openness and path-connectivity) we will show that for the class of Kenig-Pipher uniformly elliptic operators thesolvability of the Lp-Dirichlet problem with some finite p is equivalent to theuniform rectifiablity of the boundary. Joint work with S. Hofmann, S. Mayboroda, T. Toro, and Z. Zhao.

Published
2019

35. J.-B. Bost - Techniques d’algébrisation en géométrie analytique, formelle, et diophantienne II (Part 3)

Author

Bost, Jean-Benoît, Bastien, Fanny, Humphries, Donovan, and Bastien, Fanny

Subjects
Feuilletages et géométrie algébrique, eem2019, Foliations and algebraic geometry, géométrie diophantienne II, géométrie formelle, géométrie analytique, [MATH] Mathematics [math], Grenoble
Abstract

Dans ce cours, nous nous proposons d’expliquer comment des théorèmes d’algébrisation classiques, concernant des variétés ou des faisceux cohérents analytiques, possèdent des avatars en géométrie formelle et en géométrie diophantienne. Nous mettrons l’accent sur les points communs entre les preuves de ces différents théorèmes, et sur leurs conséquences "concrètes" concernant la géometrie et l’arithmétique des variétés algébriques. 1. Algébrisation de sous-schémas formels de variétés projectives. 2. Théorèmes de Lefschetz et géométrie formelle: les théorèmes de Grauert et de Grothendieck. 3. Algébrisation en géométrie diophantienne. 4. Applications aux feuilletages.

Published
2019

36. F. Loray - Painlevé equations and isomonodromic deformations II (Part 1)

Author

Loray, Frank, Bastien, Fanny, Humphries, Donovan, and Bastien, Fanny

Subjects
Feuilletages et géométrie algébrique, eem2019, Foliations and algebraic geometry, Painlevé equations, isomonodromic deformations, [MATH] Mathematics [math], Grenoble
Abstract

In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painlevé equations from the isomonodromic point of view. The main objects are rank 2 systems of linear differential equations on the Riemann sphere, or more generally, rank 2 connections. We will mainly focus on the case they have 4 simple poles, corresponding to the Painlevé VI equation, while other Painlevé equations correspond to confluence of these poles.First, we settle the Riemann-Hilbert correspondance which establish, roughly speaking, a one-to-one correspondance between connections and their monodromy data, once the poles are fixed. This correspondance is analytic, but not algebraic, very transcendental. Then isomonodromic deformations arise when we deform poles and connection without deforming the monodromy representation. Although the deformation is also transcendental in general, the coefficients satisfy a non linear polynomial differential equation, namely the Painlevé VI equation. By constructing an universal isomonodromic deformation, we explain how Malgrange proved the Painlevé property for isomonodromic deformation equations: solutions admit analytic continuation (with poles) outside of a fixed singular set. At the end, we can describe the Okamoto space of initial conditions for Painlevé VI equation, as well as its non linear monodromy. This can be used to prove the irreductibility of Painlevé VI equation, i.e. the absence of special first integrals, and therefore the transcendance of the general solution.

Published
2019

37. J. Demailly - Existence of logarithmic and orbifold jet differentials

Author

Demailly, Jean-Pierre, Bastien, Fanny, Humphries, Donovan, and Bastien, Fanny

Subjects
Feuilletages et géométrie algébrique, eem2019, Foliations and algebraic geometry, orbifold jet differentials, logarithmic jet differentials, [MATH] Mathematics [math], Mathematics::Symplectic Geometry, Grenoble
Abstract

Given a projective algebraic orbifold, one can define associated logarithmic and orbifold jet bundles. These bundles describe the algebraic differential operators that act on germs of curves satisfying ad hoc ramification conditions. Holomorphic Morse inequalities can be used to derive precise cohomology estimates and, in particular, lower bounds for the dimensions of spaces of global jet differentials. A striking consequence is that, under suitable geometric hypotheses, the corresponding entire curves must satisfy nontrivial algebraic differential equations. These results extend those obtained by the author in 2010, and are based on recent joint work with F. Campana, L. Darondeau and E. Rousseau.

Published
2019

38. S. Druel - A decomposition theorem for singular spaces with trivial canonical class (Part 4)

Author

Druel, Stéphane, Bastien, Fanny, Humphries, Donovan, and Bastien, Fanny

Subjects
Feuilletages et géométrie algébrique, Mathematics::Algebraic Geometry, eem2019, Foliations and algebraic geometry, trivial canonical class, [MATH] Mathematics [math], singular spaces, Mathematics::Symplectic Geometry, Grenoble
Abstract

The Beauville-Bogomolov decomposition theorem asserts that any compact Kähler manifold with numerically trivial canonical bundle admits an étale cover that decomposes into a product of a torus, an irreducible, simply-connected Calabi-Yau, and holomorphic symplectic manifolds. With the development of the minimal model program, it became clear that singularities arise as an inevitable part of higher dimensional life. We will present recent works in which a singular version of the decomposition theorem is established.

Published
2019

39. I. Gentil - Le problème de Schrödinger, un point de vue analytique (Part 1)

Author

Gentil, Ivan, Bastien, Fanny, and Bastien, Fanny

Subjects
UGA, problème de Schrödinger, CNRS, [MATH] Mathematics [math], Rencontres du GDR AFHP 2019, institut fourier, Grenoble
Abstract

Ce cours est divisé en trois parties, le but étant de comprendre le problème de Schrödinger avec un point de vue analytique. Le premier cours porte sur le problème de Schrödinger. C’est un problème de minimisation de l’entropie sur un ensemble de mesures de probabilités sur les trajectoires. Ce problème a été énoncé par Schrödinger lui même dans les années 30. Dans ce premier cours on verra les théorèmes fondamentaux sans forcément entrer dans les preuves techniques.Le deuxième cours porte sur le calcul d’Otto. Ce calcul permet, au moins de façon heuristique, de considérer l’espace des mesures de probabilités (par exemple sur une variété riemannienne) comme une variété riemannienne de dimension infinie. L’intérêt du calcul d’Otto est d’avoir un point de vue flot de gradient d’équations paraboliques classiques. Par exemple, l’équation de la chaleur est le flot de gradient de l’entropie par rapport à la métrique d’Otto. Enfin le dernier cours rapproche Schrödinger et Otto. On montre que les minimiseurs du problème de Schrödinger vérifient une équation de Newton au sens d’Otto. Cette formulation, montrée récemment par G. Conforti, permet de voir le problème de Schrödinger comme la minimisation d’un lagrangien en dimension infinie.

Published
2019

40. E. Floris - Birational geometry of foliations on surfaces (Part 2)

Author

Floris, Enrica, Bastien, Fanny, Humphries, Donovan, and Bastien, Fanny

Subjects
Feuilletages et géométrie algébrique, Mathematics::Algebraic Geometry, Mathematics::Dynamical Systems, eem2019, Foliations and algebraic geometry, Mathematics::Differential Geometry, [MATH] Mathematics [math], surfaces, Mathematics::Symplectic Geometry, birational geometry, Grenoble
Abstract

The goal of this minicourse is to introduce MMP for foliations on surfaces and to outline the classification of foliations on projective surfaces up to birational equivalence.

Published
2019

41. F. Loray - Painlevé equations and isomonodromic deformations II (Part 2)

Author

Loray, Frank, Bastien, Fanny, Humphries, Donovan, and Bastien, Fanny

Subjects
Feuilletages et géométrie algébrique, eem2019, Foliations and algebraic geometry, Painlevé equations, isomonodromic deformations, [MATH] Mathematics [math], Grenoble
Abstract

In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painlevé equations from the isomonodromic point of view. The main objects are rank 2 systems of linear differential equations on the Riemann sphere, or more generally, rank 2 connections. We will mainly focus on the case they have 4 simple poles, corresponding to the Painlevé VI equation, while other Painlevé equations correspond to confluence of these poles.First, we settle the Riemann-Hilbert correspondance which establish, roughly speaking, a one-to-one correspondance between connections and their monodromy data, once the poles are fixed. This correspondance is analytic, but not algebraic, very transcendental. Then isomonodromic deformations arise when we deform poles and connection without deforming the monodromy representation. Although the deformation is also transcendental in general, the coefficients satisfy a non linear polynomial differential equation, namely the Painlevé VI equation. By constructing an universal isomonodromic deformation, we explain how Malgrange proved the Painlevé property for isomonodromic deformation equations: solutions admit analytic continuation (with poles) outside of a fixed singular set. At the end, we can describe the Okamoto space of initial conditions for Painlevé VI equation, as well as its non linear monodromy. This can be used to prove the irreductibility of Painlevé VI equation, i.e. the absence of special first integrals, and therefore the transcendance of the general solution.

Published
2019

42. C. Araujo - Foliations and birational geometry (Part 1)

Author

Araujo, Carolina, Bastien, Fanny, Humphries, Donovan, and Bastien, Fanny

Subjects
Mathematics::Algebraic Geometry, eem2019, Foliations and algebraic geometry, Mathematics::Differential Geometry, [MATH] Mathematics [math], Mathematics::Symplectic Geometry, birational geometry, Grenoble
Abstract

In the last few decades, much progress has been made in birational algebraic geometry. The general viewpoint is that complex projective manifolds should be classified according to the behavior of their canonical class. As a result of the minimal model program (MMP), every complex projective manifold can be built up from 3 classes of (possibly singular) projective varieties, namely, varieties $X$ for which $K_X$ satisfies $K_X0$. Projective manifolds $X$ whose anti-canonical class $-K_X$ is ample are called Fano manifolds.Techniques from the MMP have been successfully applied to the study of global properties of holomorphic foliations. This led, for instance, to Brunella's birational classification of foliations on surfaces, in which the canonical class of the foliation plays a key role. In recent years, much progress has been made in higher dimensions. In particular, there is a well developed theory of Fano foliations, i.e., holomorphic foliations $F$ on complex projective varieties with ample anti-canonical class $-K_F$.The first half of this mini-course will be devoted to explaining the MMP and reviewing some aspects of the theory of Fano manifolds. In the second half, we will explore the foliated counterpart of this theory, with a special emphasis on Fano foliations.

Published
2019

43. C. Gasbarri - Techniques d’algébrisation en géométrie analytique, formelle, et diophantienne I (Part 1)

Author

Gasbarri, Carlo, Bastien, Fanny, Humphries, Donovan, and Bastien, Fanny

Subjects
Feuilletages et géométrie algébrique, eem2019, Foliations and algebraic geometry, géométrie diophantienne, géométrie formelle, géométrie analytique, [MATH] Mathematics [math], Grenoble
Abstract

Dans ce cours, nous nous proposons d’expliquer comment des théorèmes d’algébrisation classiques, concernant des variétés ou des faisceux cohérents analytiques, possèdent des avatars en géométrie formelle et en géométrie diophantienne. Nous mettrons l’accent sur les points communs entre les preuves de ces différents théorèmes, et sur leurs conséquences "concrètes" concernant la géometrie et l’arithmétique des variétés algébriques. 1.Algébrisation des variétés analytiques projectives: les théorèmes de Siegel et de Chow.2.Autour du théorème de Lefschetz faible.3.Une introduction à la géométrie formelle.4.Le théorème d’algébrisation de Grothendieck.

Published
2019

44. I. Gentil - Le problème de Schrödinger, un point de vue analytique (Part 2)

Author

Gentil, Ivan, Bastien, Fanny, and Bastien, Fanny

Subjects
UGA, problème de Schrödinger, CNRS, [MATH] Mathematics [math], Rencontres du GDR AFHP 2019, institut fourier, Grenoble
Abstract

Ce cours est divisé en trois parties, le but étant de comprendre le problème de Schrödinger avec un point de vue analytique. Le premier cours porte sur le problème de Schrödinger. C’est un problème de minimisation de l’entropie sur un ensemble de mesures de probabilités sur les trajectoires. Ce problème a été énoncé par Schrödinger lui même dans les années 30. Dans ce premier cours on verra les théorèmes fondamentaux sans forcément entrer dans les preuves techniques.Le deuxième cours porte sur le calcul d’Otto. Ce calcul permet, au moins de façon heuristique, de considérer l’espace des mesures de probabilités (par exemple sur une variété riemannienne) comme une variété riemannienne de dimension infinie. L’intérêt du calcul d’Otto est d’avoir un point de vue flot de gradient d’équations paraboliques classiques. Par exemple, l’équation de la chaleur est le flot de gradient de l’entropie par rapport à la métrique d’Otto. Enfin le dernier cours rapproche Schrödinger et Otto. On montre que les minimiseurs du problème de Schrödinger vérifient une équation de Newton au sens d’Otto. Cette formulation, montrée récemment par G. Conforti, permet de voir le problème de Schrödinger comme la minimisation d’un lagrangien en dimension infinie.

Published
2019

45. A. Guionnet - Pavages aléatoires

Author

Guionnet, Alice, Bastien, Fanny, and Bastien, Fanny

Subjects
UGA, CNRS, [MATH] Mathematics [math], 70 ans des AIF, institut fourier, pavages, Grenoble
Abstract

Considérons le problème de paver un domaine par des losanges. Quand cela est possible, nous pouvons tirer un pavage au hasard dans tous les pavages possibles. De quoi a l'air ce pavage ? Nous discuterons de cette question ancienne.

Published
2019

46. C. Araujo - Foliations and birational geometry (Part 3)

Author

Araujo, Carolina, Bastien, Fanny, Humphries, Donovan, and Bastien, Fanny

Subjects
Feuilletages et géométrie algébrique, Mathematics::Algebraic Geometry, eem2019, Foliations and algebraic geometry, Mathematics::Differential Geometry, [MATH] Mathematics [math], Mathematics::Symplectic Geometry, birational geometry, Grenoble
Abstract

In the last few decades, much progress has been made in birational algebraic geometry. The general viewpoint is that complex projective manifolds should be classified according to the behavior of their canonical class. As a result of the minimal model program (MMP), every complex projective manifold can be built up from 3 classes of (possibly singular) projective varieties, namely, varieties $X$ for which $K_X$ satisfies $K_X0$. Projective manifolds $X$ whose anti-canonical class $-K_X$ is ample are called Fano manifolds.Techniques from the MMP have been successfully applied to the study of global properties of holomorphic foliations. This led, for instance, to Brunella's birational classification of foliations on surfaces, in which the canonical class of the foliation plays a key role. In recent years, much progress has been made in higher dimensions. In particular, there is a well developed theory of Fano foliations, i.e., holomorphic foliations $F$ on complex projective varieties with ample anti-canonical class $-K_F$.The first half of this mini-course will be devoted to explaining the MMP and reviewing some aspects of the theory of Fano manifolds. In the second half, we will explore the foliated counterpart of this theory, with a special emphasis on Fano foliations.

Published
2019

47. E. Floris - Birational geometry of foliations on surfaces (Part 4)

Author

Floris, Enrica, Bastien, Fanny, Humphries, Donovan, and Bastien, Fanny

Subjects
Feuilletages et géométrie algébrique, Mathematics::Algebraic Geometry, Mathematics::Dynamical Systems, eem2019, Foliations and algebraic geometry, Mathematics::Differential Geometry, [MATH] Mathematics [math], surfaces, Mathematics::Symplectic Geometry, birational geometry, Grenoble
Abstract

The goal of this minicourse is to introduce MMP for foliations on surfaces and to outline the classification of foliations on projective surfaces up to birational equivalence.

Published
2019

48. J.-B. - Techniques d’algébrisation en géométrie analytique, formelle, et diophantienne II (Part 2)

Author

Bost, Jean-Benoît, Bastien, Fanny, Humphries, Donovan, and Bastien, Fanny

Subjects
Feuilletages et géométrie algébrique, eem2019, Foliations and algebraic geometry, géométrie diophantienne II, géométrie formelle, géométrie analytique, [MATH] Mathematics [math], Grenoble
Abstract

Dans ce cours, nous nous proposons d’expliquer comment des théorèmes d’algébrisation classiques, concernant des variétés ou des faisceux cohérents analytiques, possèdent des avatars en géométrie formelle et en géométrie diophantienne. Nous mettrons l’accent sur les points communs entre les preuves de ces différents théorèmes, et sur leurs conséquences "concrètes" concernant la géometrie et l’arithmétique des variétés algébriques. 1. Algébrisation de sous-schémas formels de variétés projectives. 2. Théorèmes de Lefschetz et géométrie formelle: les théorèmes de Grauert et de Grothendieck. 3. Algébrisation en géométrie diophantienne. 4. Applications aux feuilletages.

Published
2019

49. C. Araujo - Foliations and birational geometry (Part 4)

Author

Araujo, Carolina, Bastien, Fanny, Humphries, Donovan, and Bastien, Fanny

Subjects
Feuilletages et géométrie algébrique, Mathematics::Algebraic Geometry, eem2019, Foliations and algebraic geometry, Mathematics::Differential Geometry, [MATH] Mathematics [math], Mathematics::Symplectic Geometry, birational geometry, Grenoble
Abstract

In the last few decades, much progress has been made in birational algebraic geometry. The general viewpoint is that complex projective manifolds should be classified according to the behavior of their canonical class. As a result of the minimal model program (MMP), every complex projective manifold can be built up from 3 classes of (possibly singular) projective varieties, namely, varieties $X$ for which $K_X$ satisfies $K_X0$. Projective manifolds $X$ whose anti-canonical class $-K_X$ is ample are called Fano manifolds.Techniques from the MMP have been successfully applied to the study of global properties of holomorphic foliations. This led, for instance, to Brunella's birational classification of foliations on surfaces, in which the canonical class of the foliation plays a key role. In recent years, much progress has been made in higher dimensions. In particular, there is a well developed theory of Fano foliations, i.e., holomorphic foliations $F$ on complex projective varieties with ample anti-canonical class $-K_F$.The first half of this mini-course will be devoted to explaining the MMP and reviewing some aspects of the theory of Fano manifolds. In the second half, we will explore the foliated counterpart of this theory, with a special emphasis on Fano foliations.

Published
2019

50. C. Araujo - Foliations and birational geometry (Part 2)

Author

Araujo, Carolina, Bastien, Fanny, Humphries, Donovan, and Bastien, Fanny

Subjects
Feuilletages et géométrie algébrique, Mathematics::Algebraic Geometry, eem2019, Foliations and algebraic geometry, Mathematics::Differential Geometry, [MATH] Mathematics [math], Mathematics::Symplectic Geometry, birational geometry, Grenoble
Abstract

In the last few decades, much progress has been made in birational algebraic geometry. The general viewpoint is that complex projective manifolds should be classified according to the behavior of their canonical class. As a result of the minimal model program (MMP), every complex projective manifold can be built up from 3 classes of (possibly singular) projective varieties, namely, varieties $X$ for which $K_X$ satisfies $K_X0$. Projective manifolds $X$ whose anti-canonical class $-K_X$ is ample are called Fano manifolds.Techniques from the MMP have been successfully applied to the study of global properties of holomorphic foliations. This led, for instance, to Brunella's birational classification of foliations on surfaces, in which the canonical class of the foliation plays a key role. In recent years, much progress has been made in higher dimensions. In particular, there is a well developed theory of Fano foliations, i.e., holomorphic foliations $F$ on complex projective varieties with ample anti-canonical class $-K_F$.The first half of this mini-course will be devoted to explaining the MMP and reviewing some aspects of the theory of Fano manifolds. In the second half, we will explore the foliated counterpart of this theory, with a special emphasis on Fano foliations.

Published
2019

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