Boundary regularity and Wiener-type criteria at infinity for nonlinear elliptic equations of p-Laplace type

Abstract

We study boundary regularity at the infinity point ∞ for nonlinear elliptic equations of p-Laplace type in unbounded open sets ⊂ Rn. We consider the case p n 2 and characterize the regularity at ∞ by means of Wiener-type integrals. Our approach uses circular inversion, which maps ∞ to the origin and the original nonlinear equation to a similar weighted equation. The Wiener criterion at the origin for such equations is then transformed back to provide Wiener-type criteria at ∞. When p>n, the criteria simplify so that ∞ is regular if and only if the boundary ∂ is unbounded. For p=n this is not true, as shown by an example. This simplified criterion is also proved for p-harmonic functions in unbounded open subsets of Ahlfors Q-regular metric measure spaces with Q<p, supporting a Poincar\'e inequality.

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