• 2033 - Cohomology of Finite Groups: Interactions and Applications (hybrid meeting) 

      [OWR-2020-23] Workshop Report 2020,23 (2020) - (09 Aug - 15 Aug 2020)
      The cohomology of finite groups is an important tool in many subjects including representation theory and algebraic topology. This meeting was the fifth in a series that has emphasized the interactions of group ...
    • 2026 - Geometric Structures in Group Theory (hybrid meeting) 

      [OWR-2020-16] Workshop Report 2020,16 (2020) - (21 Jun - 27 Jun 2020)
      The conference focused on the use of geometric methods to study infinite groups and the interplay of group theory with other areas. One of the central techniques in geometric group theory is to study infinite discrete ...
    • 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 ...
    • 2009a - Mini-Workshop: Kronecker, Plethysm, and Sylow Branching Coefficients and their Applications to Complexity Theory 

      [OWR-2020-9] Workshop Report 2020,9 (2020) - (23 Feb - 29 Feb 2020)
      The Kronecker, plethysm and Sylow branching coefficients describe the decomposition of representations of symmetric groups obtained by tensor products and induction. Understanding these decompositions has been hailed ...
    • 2003 - Model Theory: Groups, Geometries and Combinatorics 

      [OWR-2020-2] Workshop Report 2020,2 (2020) - (12 Jan - 18 Jan 2020)
      The focus of the conference were recent interactions between model theory, group theory and combinatorics in finite geometries. In some cases, in particular in non-archimedean geometry or combinatorics in finite geometries, ...
    • 2004 - Representation Theory of Quivers and Finite Dimensional Algebras 

      [OWR-2020-3] Workshop Report 2020,3 (2020) - (19 Jan - 25 Jan 2020)
      Methods and results from the representation theory of quivers and finite dimensional algebras have led to many interactions with other areas of mathematics. Such areas include the theory of Lie algebras and quantum ...