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Overtwisted = Tight in 3 dimensions - Francisco Presas Mata
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Classroom Contents
Workshop on the H-Principle and Beyond
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- 1 Overtwisted = Tight in 3 dimensions - Francisco Presas Mata
- 2 Looking at Euler flows through a contact mirror: Universality, Turing… - Eva Miranda
- 3 Local flexibility for open partial differential relations - Bernhard Hanke
- 4 Mather-Thurston’s theory, non abelian Poincare duality and diffeomorphism groups - Sam Nariman
- 5 Holonomic Approximation through Convex Integration - Mélanie Theilliere
- 6 The many facets of complexity of Beltrami fields in Euclidean space - Daniel Peralta-Salas
- 7 Chaos in the incompressible Euler equation on manifolds of high dimensi - Francisco Torres de Lizaur
- 8 The flexibility of caustics and its applications - Daniel Alvarez-Gavela
- 9 A Controlled Mather Thurston Theorem - Mike Freedman
- 10 Hamiltonian geometry behind compressible fluids - Boris Khesin
- 11 Regularity of the limit set of embedded Poincaré Disks - Vincent Borelli
- 12 A topological view on the Monge-Ampere equation without convexity assumptions - Jonas Hirsch
- 13 Ampleness up to avoidance - Alvaro del Pino Gomez
- 14 A (slightly deeper) look into the restricted 3-body problem -Agustin Moreno
- 15 A h-principle for locally conformal symplectic structures - Mélanie Bertelson
- 16 Flexibilization as localization - Oleg Lazarev
- 17 On some geometry-grounded problems involving PDEs, Dynamics, and discretization - Dmitri Burago
- 18 Flexibility in C^0 symplectic geometry - Lev Buhovsky
