Counterexamples to the Lp-Calder\'on--Zygmund Estimate on Open Manifolds
Abstract
Based on a construction due to B. G\"uneysu and S. Pigola (Adv. Math. 281 (2015), pp.353--393), for each p ∈ [1,∞] and m ∈ Z≥ 2, we exhibit an m-dimensional Riemannian open manifold M on which the Lp-Calder\'on--Zygmund estimate equation* \|∇ ∇ f\|pLp ≤ C1 \| f\|Lpp + C2 \| f\|Lpp for all f ∈ C∞c(M) equation* is false for any C1, C2 depending on m and p. Therefore, one must impose further geometric conditions on the manifold to ensure the validity of the Calder\'on--Zygmund estimate.
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