Haibo Lin¹ and Yan Meng²

Copyright © 2008 Haibo Lin and Yan Meng. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

Let μ be a nonnegative Radon measure on ℝd which only satisfies the following growth condition that there exists a positive constant C such that μ(B(x,r))≤Crn for all x∈ℝd, r>0 and some fixed n∈(0,d]. In this paper, the authors prove that for suitable indexes ρ and λ, the parametrized gλ∗ function ℳλ∗,ρ is bounded on Lp(μ) for p∈[2,∞) with the assumption that the kernel of the operator ℳλ∗,ρ satisfies some Hörmander-type condition, and is bounded from L1(μ) into weak L1(μ) with the assumption that the kernel satisfies certain slightly stronger Hörmander-type condition. As a corollary, ℳλ∗,ρ with the kernel satisfying the above stronger Hörmander-type condition is bounded on Lp(μ) for p∈(1,2). Moreover, the authors prove that for suitable indexes ρ and λ,ℳλ∗,ρ is bounded from L∞(μ) into RBLO(μ) (the space of regular bounded lower oscillation functions) if the kernel satisfies the Hörmander-type condition, and from the Hardy space H1(μ) into L1(μ) if the kernel satisfies the above stronger Hörmander-type condition. The corresponding properties for the parametrized area integral ℳSρ are also established in this paper.