On maximal functions generated by H\"ormander-type spectral multipliers

Abstract

Let (X,d,μ) be a metric space with doubling measure and L be a nonnegative self-adjoint operator on L2(X) whose heat kernel satisfies the Gaussian upper bound. We assume that there exists an L-harmonic function h such that the semigroup (-tL), after applying the Doob transform related to h, satisfies the upper and lower Gaussian estimates. In this paper we apply the Doob transform and some techniques as in Grafakos-Honz\'ik-Seeger GHS2006 to obtain an optimal (1+N) bound in Lp for the maximal function 1≤ i≤ N|mi(L)f| for multipliers mi,1≤ i≤ N, with uniform estimates. Based on this, we establish sufficient conditions on the bounded Borel function m such that the maximal function Mm,Lf(x) = t>0 |m(tL)f(x)| is bounded on Lp(X). The applications include Schr\"odinger operators with inverse square potential, Scattering operators, Bessel operators and Laplace-Beltrami operators.

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