Removable singularities for div v = f in weighted Lebesgue spaces
Abstract
Let w∈ L1\loc(n) be apositive weight. Assuming that a doubling condition and an L1 Poincar\'e inequality on balls for the measure w(x)dx, as well as a growth condition on w, we prove that the compact subsets of n which are removable for the distributional divergence in L∞\1/w are exactly those with vanishing weighted Hausdorff measure. We also give such a characterization for Lp\1/w, 1p+∞, in terms of capacity. This generalizes results due to Phuc and Torres, Silhavy and the first author.
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