MCS spaces are CS sets whose MCS stratification coincides with the intrinsic stratification.
Weighted norm inequalities for rough singular integral operators
5 Pith papers cite this work. Polarity classification is still indexing.
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UNVERDICTED 5representative citing papers
New unified proof of the Positive Mass Theorem and Riemannian Penrose Inequality for 3D asymptotically flat manifolds with C^{2,α} metrics up to a hypersurface, via approximate monotonicity of a potential-theoretic quantity.
Proves L is k-dense iff L_n,lim is G_delta and constructs k-dense lattices with sigma_n(L_n,lim) equal to 0 or 1 via Khintchine-Groshev theorem.
Establishes monotone quantities and sharp mass-p-capacity inequalities for p-capacitary functions in 3D AF half-spaces with nonnegative scalar and boundary mean curvature, equality on Schwarzschild half-spaces.
Obtains pointwise sparse bounds for rough pseudodifferential operators with measurable spatial symbols and gives sufficient conditions that recover known sparse bounds for symbols in S^0_{1,δ} with δ < 1.
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MCS Spaces are CS
MCS spaces are CS sets whose MCS stratification coincides with the intrinsic stratification.