An asymtotic sharp Sobolev regularity for planar infinity harmonic functions
Abstract
Given an arbitrary planar ∞-harmonic function u, for each α>0 we establish a quantitative local W1,2-estimate of |Du|α , which is sharp as α0. We also show that the distributional determinant of u is a Radon measure enjoying some quantitative lower and upper bounds. As a by-product, for each p>2 we obtain some quantitative local W1,p-estimates of u, and consequently, an Lp-Liouville property for ∞-harmonic functions in whole plane.
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