Comparison Principles for the Finsler Infinity Laplacian with Applications to Minimal Lipschitz Extensions

Abstract

This paper proves comparison principles for elliptic PDE involving the Finsler infinity Laplacian, a second-order differential operator with discontinuities in the gradient variable arising in L∞-variational problems and tug-of-war games. The core of the paper consists in proving generalized cone comparison principles. Among other consequences, these results imply that, for any Finsler norm in Rd, a function u is a -absolutely minimizing Lipschitz extension if and only if it is a viscosity solution of the -infinity Laplace equation, settling a longstanding question in the L∞-calculus of variations. The proofs combine new geometric constructions with classical notions from convex analysis.

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