Riesz transforms of the Hodge-de Rham Laplacian on Riemannian manifolds

Abstract

Let M be a complete non-compact Riemannian manifold satisfying the doubling volume property. Let be the Hodge-de Rham Laplacian acting on 1-differential forms. According to the Bochner formula, =∇*∇+R+-R- where R+ and R- are respectively the positive and negative part of the Ricci curvature and ∇ is the Levi-Civita connection. We study the boundedness of the Riesz transform d*()-1/2 from Lp(1T*M) to Lp(M) and of the Riesz transform d()-12 from Lp(1T*M) to Lp(2T*M). We prove that, if the heat kernel on functions pt(x,y) satisfies a Gaussian upper bound and if the negative part R- of the Ricci curvature is ε-sub-critical for some ε∈[0,1), then d*()-12 is bounded from Lp(1T*M) to Lp(M) and d()-12 is bounded from Lp(1T*M) to Lp(2T* M) for p∈(p0',2] where p0>2 depends on ε and on a constant appearing in the doubling volume property. A duality argument gives the boundedness of the Riesz transform d()-12 from Lp(M) to Lp(1T*M) for p∈ [2,p0) where is the non-negative Laplace-Beltrami operator. We also give a condition on R- to be ε-sub-critical under both analytic and geometric assumptions.