Estimates for functions of the Laplacian on manifolds with bounded geometry

TL;DR

This paper extends spectral multiplier theorems for the Laplacian on manifolds with bounded geometry, showing that under mild heat kernel decay conditions, bounded holomorphic functions satisfying Mihlin-Hormander criteria induce weak type 1 operators.

Contribution

It generalizes previous results by relaxing curvature assumptions and incorporating decay conditions on the heat kernel for spectral multipliers.

Findings

Spectral multipliers extend to weak type 1 under mild decay conditions.

Generalization of Cheeger-Gromov-Taylor results to broader geometric settings.

Operators associated with bounded holomorphic functions satisfy weak type bounds.

Abstract

In this paper we consider a complete connected noncompact Riemannian manifold M with Ricci curvature bounded from below and positive injectivity radius. Denote by L the Laplace-Beltrami operator on M. We assume that the kernel associated to the heat semigroup generated by L satisfies a mild decay condition at infinity. We prove that if m is a bounded holomorphic function in a suitable strip of the complex plane, and satisfies Mihlin-Hormander type conditions of appropriate order at infinity, then the operator m(L) extends to an operator of weak type 1. This partially extends a celebrated result of J. Cheeger, M. Gromov and M. Taylor, who proved similar results under much stronger curvature assumptions on M, but without any assumption on the decay of the heat kernel.