Predual Spaces of Banach Completions of Orlicz-Hardy Spaces Associated with Operators

Abstract

Let L be a linear operator in L2( Rn) and generate an analytic semigroup \e-tL\t 0 with kernels satisfying an upper bound of Poisson type, whose decay is measured by θ(L)∈ (0,∞]. Let ω on (0,∞) be of upper type 1 and of critical lower type p0(ω)∈ (n/(n+θ(L)), 1] and (t)=t-1/ω-1(t-1) for t∈ (0,∞). In this paper, the authors first introduce the VMO-type space VMO,L( Rn) and the tent space T∞ω, v( Rn+1+) and characterize the space VMO,L( Rn) via the space T∞ω, v( Rn+1+). Let Tω ( Rn+1+) be the Banach completion of the tent space Tω( Rn+1+). The authors then prove that Tω( Rn+1+) is the dual space of T∞ω, v( Rn+1+). As an application of this, the authors finally show that the dual space of VMO,L( Rn) is the space Bω,L( Rn), where L denotes the adjoint operator of L in L2( Rn) and Bω,L( Rn) the Banach completion of the Orlicz-Hardy space Hω,L( Rn). These results generalize the known recent results by particularly taking ω(t)=t for t∈ (0,∞).