Abstract
In this paper, we relate the theory of quasi-conformal maps to the regularity of the solutions to nonlinear thin-obstacle problems; we prove that the contact set is locally a finite union of intervals and apply this result to the solutions of one-phase Bernoulli free boundary problems with geometric constraint. We also introduce a new conformal hodograph transform, which allows to obtain the precise expansion at branch points of both the solutions to the one-phase problem with geometric constraint and a class of symmetric solutions to the two-phase problem, as well as to construct examples of free boundaries with cusp-like singularities.
| Original language | English (US) |
|---|---|
| Pages (from-to) | 3369-3406 |
| Number of pages | 38 |
| Journal | Journal of the European Mathematical Society |
| Volume | 27 |
| Issue number | 8 |
| DOIs | |
| State | Published - 2025 |
Keywords
- Alt–Caffarelli–Friedman problem
- branch points
- nonlinear thin-obstacle problem
- quasi-conformal maps
- regularity for free boundary problems
ASJC Scopus subject areas
- General Mathematics
- Applied Mathematics