Musielak-Orlicz-Hardy Spaces Associated with Operators Satisfying Reinforced Off-Diagonal Estimates

Abstract

Let X be a metric space with doubling measure and L a one-to-one operator of type ω having a bounded H∞-functional calculus in L2(X) satisfying the reinforced (pL, qL) off-diagonal estimates on balls, where pL∈[1,2) and qL∈(2,∞]. Let :\,X×[0,∞)[0,∞) be a function such that (x,·) is an Orlicz function, (·,t)∈ A∞(X) (the class of uniformly Muckenhoupt weights), its uniformly critical upper type index I()∈(0,1] and (·,t) satisfies the uniformly reverse H\"older inequality of order (qL/I())'. In this paper, the authors introduce a Musielak-Orlicz-Hardy space H,\,L(X), via the Lusin-area function associated with L, and establish its molecular characterization. In particular, when L is nonnegative self-adjoint and satisfies the Davies-Gaffney estimates, the atomic characterization of H,\,L(X) is also obtained. Furthermore, a sufficient condition for the equivalence between H,\,L(Rn) and the classical Musielak-Orlicz-Hardy space H(Rn) is given. Moreover, for the Musielak-Orlicz-Hardy space H,\,L(Rn) associated with the second order elliptic operator in divergence form on or the Schr\"odinger operator L:=-+V with 0 V∈ L1loc(Rn), the authors further obtain its several equivalent characterizations in terms of various non-tangential and radial maximal functions; finally, the authors discuss the boundedness of the Riesz transform ∇ L-1/2.