Tug-of-war and the infinity Laplacian
Abstract
We prove that every bounded Lipschitz function F on a subset Y of a length space X admits a tautest extension to X, i.e., a unique Lipschitz extension u for which LipU u = Lipboundary of U u for all open subsets U of X that do not intersect Y. This was previously known only for bounded domains Rn, in which case u is infinity harmonic, that is, a viscosity solution to Deltainfty u = 0. We also prove the first general uniqueness results for Deltainfty u = g on bounded subsets of Rn (when g is uniformly continuous and bounded away from zero), and analogous results for bounded length spaces. The proofs rely on a new game-theoretic description of u. Let uepsilon(x) be the value of the following two-player zero-sum game, called tug-of-war: fix x0=x ∈ X minus Y. At the kth turn, the players toss a coin and the winner chooses an xk with d(xk, xk-1)< epsilon. The game ends when xk is in Y, and player one's payoff is F(xk) - (epsilon2/2) sumi=0k-1 g(xi) We show that the uε converge uniformly to u as epsilon tends to zero. Even for bounded domains in Rn, the game theoretic description of infinity-harmonic functions yields new intuition and estimates; for instance, we prove power law bounds for infinity-harmonic functions in the unit disk with boundary values supported in a delta-neighborhood of a Cantor set on the unit circle.
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