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 $\boldsymbol{\infty}$ for nonlinear elliptic equations of $p$-Laplace type in unbounded open sets $Ω\subset \mathbf{R}^n$. We consider the case $p \ge n \ge 2$ and characterize the regularity at $\boldsymbol{\infty}$ by means of Wiener-type integrals. Our approach uses circular inversion, which maps $\boldsymbol{\infty}$ 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 $\boldsymbol{\infty}$. When $p>n$, the criteria simplify so that $\boldsymbol{\infty}$ is regular if and only if the boundary $\partialΩ$ 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 Poincaré inequality.