L p -estimates for the heat semigroup on differential forms, and related problems

Abstract

We consider a complete non-compact Riemannian manifold satisfying the volume doubling property and a Gaussian upper bound for its heat kernel (on functions). Let -- → k be the Hodge-de Rham Laplacian on differential k-forms with k 1. By the Bochner decomposition formula -- → k = * + R k. Under the assumption that the negative part R -- k is in an enlarged Kato class, we prove that for all p ∈ [1, ∞], e --t -- → k p--p C(t log t) D 4 (1-- 2 p) (for large t). This estimate can be improved if R -- k is strongly sub-critical. In general, (e --t -- → k) t>0 is not uniformly bounded on L p for any p = 2. We also prove the gradient estimate e --t p--p Ct -- 1 p , where is the Laplace-Beltrami operator (acting on functions). Finally we discuss heat kernel bounds on forms and the Riesz transform on L p for p > 2.