Lp gradient estimates and Calder\'on--Zygmund inequalities under Ricci lower bounds
Abstract
In this paper we investigate the validity of first and second order Lp estimates for the solutions of the Poisson equation depending on the geometry of the underlying manifold. We first present Lp estimates of the gradient under the assumption that the Ricci tensor is lower bounded in a local integral sense and construct the first counterexample showing that they are false, in general, without curvature restrictions. Next, we obtain Lp estimates for the second order Riesz transform (or, equivalently, the validity of Lp Calder\'on--Zygmund inequalities) on the whole scale 1<p<+∞ by assuming that the injectivity radius is positive and that the Ricci tensor is either pointwise lower bounded or non-negative in a global integral sense. When 1<p ≤ 2, analogous Lp bounds on even higher order Riesz transforms are obtained provided that also the derivatives of Ricci are controlled up to a suitable order. In the same range of values of p, for manifolds with lower Ricci bounds and positive bottom of the spectrum, we show that the Lp norm of the Laplacian controls the whole W2,p-norm on compactly supported functions.
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