Classification of Blow-ups and Free Boundaries of Solutions to Unstable Free Boundary Problems

Abstract

In general, solutions u to \[ u(x)=f(x)\u>\ \] are not C1,1, even for f smooth and (x)0. Points around which u is not C1,1 are called singular points, and the set of all such points, the singular set. In this article we analyze blow-ups, the free boundary ∂\u>\, and the singular set close to singular points x0=(x0,y0,z0) in R3. We show that blow-ups of the form \[ j∞u(rj·+x0)\|u\|L∞(Brj(x0)), \] rj0+ are unique, the free boundary ∂\u>\ is up to rotations close to the surfaces (x-x0)2+(y-y0)2=2(z-z0)2 or (x-x0)2=(z-z0)2, and that singular points are either isolated or contained in a C1 curve. The methods of the proofs are based on projecting the solutions u on the space of harmonic two-homogeneous polynomials.