Weak Hardy Spaces WHLp( Rn) Associated to Operators Satisfying k-Davies-Gaffney Estimates

Abstract

Let L be a one-to-one operator of type ω having a bounded H∞ functional calculus and satisfying the k-Davies-Gaffney estimates with k∈ N. In this paper, the authors introduce the weak Hardy space WHLp(Rn) associated to L for p∈ (0,\,1] via the non-tangential square function SL and establish a weak molecular characterization of WHLp(Rn). Typical examples of such operators include the 2k-order divergence form homogeneous elliptic operator L1:=(-1)kΣ|α|=k=|β|∂β(aα,β∂α), where \aα,β\|α|=k=|β| are complex bounded measurable functions, and the 2k-order Schr\"odinger type operator L2:= (-)k+Vk, where is the Laplacian operator and 0 V∈ Lk(Rn). As applications, for i∈\1,\,2\ and p∈(nn+k,\,1], the authors prove that the associated Riesz transform ∇k (Li-1/2) is bounded from WHpLi(Rn) to the classical weak Hardy space WHp(Rn) and, for all 0<p<r1 and α=n(1p-1r), the fractional power Li-α2k is bounded from WHLip(Rn) to WHLir(Rn). Furthermore, the authors find the dual space of WHLp(Rn) for p∈(0,\,1], which can be defined via mean oscillations based on some subtle coverings of bounded open sets and, even when L:=-, are also previously unknown. In particular, if L is a nonnegative self-adjoint operator in L2( Rn) satisfying the Davies-Gaffney estimates, the authors further establish the weak atomic characterization of WHLp(Rn).