Asymptotic flatness of Morrey extremals
Abstract
We study the limiting behavior as |x|→ ∞ of extremal functions u for Morrey's inequality on Rn. In particular, we compute the limit of u(x) as |x|→ ∞ and show |x||Du(x)| tends to 0. To this end, we exploit the fact that extremals are uniformly bounded and that they each satisfy a PDE of the form -pu=c(δx0-δy0) for some c∈ R and distinct x0,y0∈ Rn. More generally, we explain how to quantitatively deduce the asymptotic flatness of bounded p-harmonic functions on exterior domains of Rn for p>n.
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