Abstract
We analyze the Dirichlet problem for the Laplacian in a polygonal domain where boundary and angles depend on a parameter. We use the boundary integral equation, localization and Mellin transformation techniques to show that the solution has a decomposition in regular and singular parts which blow up at certain exceptional angles. We derive a modified decomposition which depends continuously on the angle.
Notes
Dedicated to the occasion of Prof. Martin Costabel’s 65th birthday.