Infinity-harmonic functions and inverse mean curvature flow clusters
Abstract
An ∞-harmonic function is a viscosity solution of ∇2 u(∇ u,∇ u)=0, or equivalently, an absolute minimizer of \|∇ u\|L∞. We prove a variety of new structural and regularity results in two dimensions, including: 1. ∞-harmonic functions in domains of R2 are C1,1/3. 2. Critical points are isolated, and at each critical point, the solution has a unique quasiradial blow-up. 3. Entire solutions with polynomial growth have unique quasiradial blow-downs, and are determined by their Fourier modes at infinity. These results are consequences of a new theory relating ∞-harmonic functions to inverse mean curvature flow (IMCF) clusters -- which are piecewise weak solutions of IMCF with common obstacle-type boundary conditions on the interfaces (a simple example is an embedded family of cuspidal curves evolving by inverse curvature). This connection arises as the p∞ limit of the classical duality between p-harmonic and q-harmonic functions in R2, where 1p+1q=1.
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