On free boundary problems shaped by oscillatory singularities

Damião Araújo, Aelson Sobral, Eduardo V. Teixeira, José Miguel Urbano

Published 2024-01-16Version 1

We start the investigation of free boundary variational models featuring oscillatory singularities. The theory varies widely depending upon the nature of the singular power $\gamma(x)$ and how it oscillates. Under a mild continuity assumption on $\gamma(x)$, we prove the optimal regularity of minimizers. Such estimates vary point-by-point, leading to a continuum of free boundary geometries. We also conduct an extensive analysis of the free boundary shaped by the singularities. Utilizing a new monotonicity formula, we show that if the singular power $\gamma(x)$ varies in a $W^{1,n^{+}}$ fashion, then the free boundary is locally a $C^{1,\delta}$ surface, up to a negligible singular set of Hausdorff co-dimension at least $2$.