Remarks on spectral multiplier theorems on Hardy spaces associated with semigroups of operators

Abstract

Let L be a non-negative, self-adjoint operator on L2(), where (, d μ) is a space of homogeneous type. Assume that the semigroup Ttt>0 generated by -L satisfies Gaussian bounds, or more generally Davies-Gaffney estimates. We say that f belongs to the Hardy space H1L if the square function Sh f(x)=( (x) |t2 L e-t2 L f(y)|2 dμ(y)μ (Bd(x,t)) dtt)1/2 belongs to L1(, dμ), where (x)=(y,t) ∈ × (0,∞): d(x,y)<t. We prove spectral multiplier theorems for L on H1L.