Game theoretical asymptotic mean value properties for non-homogeneous p-Laplace problems

Abstract

We extend the classical mean value property for the Laplacian operator to address a nonlinear and non-homogeneous problem related to the p-Laplacian operator for p>2. Specifically, we characterize viscosity solutions to the p-Laplace equation p u:=∇·(|∇ u|p-2 ∇ u) = f with a nontrivial right-hand side f, through novel asymptotic mean value formulas. While asymptotic mean value formulas for the homogeneous case (f = 0) have been previously established, leveraging the normalization pNu:=|∇ u|2-p p u = 0, which yields the 1-homogeneous normalized p-Laplacian, such normalization is not applicable when f ≠ 0. Furthermore, the mean value formulas introduced here motivate, for the first time in the literature, a game-theoretical approach for non-homogeneous p-Laplace equations. We also analyze the existence, uniqueness, and convergence of the game values, which are solutions to a dynamic programming principle derived from the mean value property.

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