• 2032 - Calculus of Variations (hybrid meeting) 

      [OWR-2020-22] Workshop Report 2020,22 (2020) - (02 Aug - 08 Aug 2020)
      Calculus of Variations touches several interrelated areas. In this workshop we covered several topics, such as minimal submanifolds, mean curvature and related flows, free boundary problems, variational models of ...
    • 2007 - Manifolds and Groups 

      [OWR-2020-7] Workshop Report 2020,7 (2020) - (09 Feb - 15 Feb 2020)
      The workshop concentrated on the interplay of advances in the understanding of manifolds and geometric group theory. In particular, we discussed mapping class groups and moduli spaces of manifolds (also of high ...
    • 2041c - Mini-Workshop: Almost Complex Geometry (online meeting) 

      [OWR-2020-33] Workshop Report 2020,33 (2020) - (04 Oct - 10 Oct 2020)
      The mini-workshop focused on very recent developments of analytic and algebraic techniques for studying almost complex structures which are not necessarily integrable. It provided a forum to discuss and compare techniques ...
    • 2048c - Mini-Workshop: Nonlocal Analysis and the Geometry of Embeddings (hybrid meeting) 

      [OWR-2020-37] Workshop Report 2020,37 (2020) - (22 Nov - 28 Nov 2020)
      Both self-avoidance and self-contact of geometric objects can be modeled using repulsive energies that separate isotopy classes. Giving rise to nonlocal operators, they are interesting objects in their own right. Moreover, ...
    • 2027 - Non-Commutative Geometry and Cyclic Homology (hybrid meeting) 

      [OWR-2020-17] Workshop Report 2020,17 (2020) - (28 Jun - 04 Jul 2020)
      The workshop on "Non-Commutative Geometry and Cyclic Homology" was attended by 16 participants on site. 30 participants could not travel to Oberwolfach because of the pandemia and took advantage of the videoconference tool. ...
    • 2038 - Variational Methods for Evolution (hybrid meeting) 

      [OWR-2020-29] Workshop Report 2020,29 (2020) - (13 Sep - 19 Sep 2020)
      Variational principles for evolutionary systems take advantage of the rich toolbox provided by the theory of the calculus of variations. Such principles are available for Hamiltonian systems in classical mechanics, gradient ...