Removable set for H\"older continuous solutions of A-harmonic functions on Finsler manifolds
Abstract
We establish that a closed set S is removable for α-H\"older continuous A-harmonic functions in a reversible Finsler manifold (, F, V) of dimension n ≥ 2, provided that (under certain conditions on (, F, V) and the variable exponent p ) for each compact subset K of S, the n1-pK++α(pK+-1)-Hausdorff measure of K is zero. Here, pK+= K p and n1 is chosen so that V(B(x, r)) ≤ K rn1 for every ball. The estimates used to remove the singularities will focus on a family \u\ ∈ J ⊂ Wloc1, p(x)( ; V) that converges to u in a certain sense. As a second main result of this article, we will also obtain an estimate (when d(x, 0) → ∞ p=1 ) for μ(B(x, r)):= \∫B(x, r) A (·, ∇ u) D ζ dV 0 ≤ ζ ≤ 1 and ζ ∈ C0∞(B(x, r))\, which is related to the measure μ=div( A (·, ∇ u)).
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