On equality of the L∞ norm of the gradient under the Hausdorff and Lebesgue measure
Abstract
Let Ω be an open subset of Rn, and let f: Ω R be differentiable Hk-almost everywhere, for some nonnegative integer k < n, where Hk denotes the k-dimensional Hausdorff measure. We show that \|∇ f\|L∞ ( Hk) = \|∇ f\|L∞( Hn). We deduce that convergence in the Sobolev space W1, ∞ preserves everywhere differentiability.
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