The Lp-Calder\'on-Zygmund inequality on non-compact manifolds of positive curvature

Abstract

We construct, for p>n, a concrete example of a complete non-compact n-dimensional Riemannian manifold of positive sectional curvature which does not support any Lp-Calder\'on-Zygmund inequality: \[ ∀\,∈ C∞c(M),\|Hess \|Lp C(\|\|Lp+\|\|Lp). \] The proof proceeds by local deformations of an initial metric which (locally) Gromov-Hausdorff converge to an Alexandrov space. In particular, we develop on some recent interesting ideas by G. De Philippis and J. N\'u\~nez-Zimbron dealing with the case of compact manifolds. As a straightforward consequence, we obtain that the Lp-gradient estimates and the Lp-Calder\'on-Zygmund inequalities are generally not equivalent, thus answering an open question in literature. Finally, our example gives also a contribution to the study of the (non-)equivalence of different definitions of Sobolev spaces on manifolds.