Spectral Multipliers II: Elliptic and Parabolic Operators and Bochner-Riesz Means

Abstract

We establish estimates for the Poisson kernel, the heat kernel, and Bochner--Riesz means defined in terms of H=-+V, where V is a possibly large rough real-valued scalar potential and H can have negative eigenvalues. All results are in three space dimensions. We eliminate several unnecessary conditions on V, leaving just V ∈ K0, meaning that V is locally integrable and (-)-1|V| is bounded. For the spectral multiplier bounds, we assume that H has no zero or positive energy bound states. For V ∈ K0, we prove that H has at most a finite number of negative bound states. If in addition V ∈ W-1/4, 4/3, then by [GoSc] and [KoTa] there are no positive energy bound states.