New Homogeneous Solutions for the One-Phase Free Boundary Problem
Abstract
For each sufficiently large integer k, we construct a domain in the round 2-sphere with k boundary components which is the link of a cone in R3 admitting a homogeneous solution to the one-phase free boundary problem. This answers a question of Jerison-Kamburov, and also disproves a conjecture of Souam left open in earlier work. The method exploits a new connection with minimal surfaces, which we also use to construct an infinite family of homogeneous solutions in dimension four.
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