Heat flow on 1-forms under lower Ricci bounds. Functional inequalities, spectral theory, and heat kernel

Abstract

We study the canonical heat flow (Ht)t≥ 0 on the cotangent module L2(T*M) over an RCD(K,∞) space (M,d,m), K∈R. We show Hess-Schrader-Uhlenbrock's inequality and, if (M,d,m) is also an RCD*(K,N) space, N∈(1,∞), Bakry-Ledoux's inequality for (Ht)t≥ 0 w.r.t. the heat flow (Pt)t≥ 0 on L2(M). Variable versions of these estimates are discussed as well. In conjunction with a study of logarithmic Sobolev inequalities for 1-forms, the previous inequalities yield various Lp-properties of (Ht)t≥ 0, p∈ [1,∞]. Then we establish explicit inclusions between the spectrum of its generator, the Hodge Laplacian , of the negative functional Laplacian -, and of the Schr\"odinger operator -+K. In the RCD*(K,N) case, we prove compactness of -1 if M is compact, and the independence of the Lp-spectrum of on p ∈ [1,∞] under a volume growth condition. We terminate by giving an appropriate interpretation of a heat kernel for (Ht)t≥ 0. We show its existence in full generality without any local compactness or doubling, and derive fundamental estimates and properties of it.