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An asymptotic expansion for the fractional p-Laplacian and for gradient-dependent nonlocal operators

Claudia Bucur, Marco Squassina

2021Communications in Contemporary Mathematics19 citationsDOIOpen Access PDF

Abstract

Mean value formulas are of great importance in the theory of partial differential equations: many very useful results are drawn, for instance, from the well-known equivalence between harmonic functions and mean value properties. In the nonlocal setting of fractional harmonic functions, such an equivalence still holds, and many applications are nowadays available. The nonlinear case, corresponding to the [Formula: see text]-Laplace operator, has also been recently investigated, whereas the validity of a nonlocal, nonlinear, counterpart remains an open problem. In this paper, we propose a formula for the nonlocal, nonlinear mean value kernel, by means of which we obtain an asymptotic representation formula for harmonic functions in the viscosity sense, with respect to the fractional (variational) [Formula: see text]-Laplacian (for [Formula: see text]) and to other gradient-dependent nonlocal operators.

Topics & Concepts

MathematicsEquivalence (formal languages)Nonlinear systemMathematical analysisHarmonicFractional calculusRepresentation (politics)Asymptotic expansionHarmonic functionMean valueApplied mathematicsHarmonic meanValue (mathematics)Asymptotic analysisHarmonic analysisPartial differential equationPure mathematicsInitial value problemNonlinear Partial Differential EquationsNumerical methods in inverse problemsDifferential Equations and Boundary Problems
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