Projects

  1. Inverse problems and spectral theory of hyperbolic manifolds related to heat kernel rigidity (led by Gilles Carron)

  2. The inverse Steklov problem on polygons (led by Emily Dryden and Carolyn Gordon)

  3. Can Dirac boundary conditions (e.g. MIT) be specified using only observable quantities (e.g. currents...)? (led by Nadine Grosse)

  4. Heat asymptotics for Steklov-type problems on manifolds and domains with singular boundaries (led by Iosif Polterovich)

  5. Convergence of Laplacians under singular perturbations (led by Olaf Post)

  6. Scattering theory for difference equations with operator coefficients (led by Luis Silva)

  7. Scattering theory for differential forms and low energy expansions: low regularity domains, relations to cohomology and harmonic analysis (led by Alexander Strohmaier)