05.06.2025, 16:15
– Raum 1.22
Forschungsseminar Differentialgeometrie
Elliptic operators and uniform K-homology
Lyko Matti (Greifswald)
Philipp Bartmann
The behaviour of solutions to elliptic PDE's at the boundary of a domain $\Omega$ depends heavily on the geometry of $\partial\Omega$. One is therefore interested in criteria to $\Omega$ that ensure differentiability, Hölder-continuity or even more regularity up to the boundary.
We will give a brief overview on the classical results in this regard and introduce an optimal geometric condition - so called $\gamma$-convexity - that guarantees differentiability at the boundary.