Musielak-Orlicz BMO-Type Spaces Associated with Generalized Approximations to the Identity

Abstract

Let X be a space of homogenous type and :\ X×[0,∞) [0,∞) a growth function such that (·,t) is a Muckenhoupt weight uniformly in t and (x,·) an Orlicz function of uniformly upper type 1 and lower type p∈(0,1]. In this article, the authors introduce a new Musielak-Orlicz BMO-type space BMOA(X) associated with the generalized approximation to the identity, give out its basic properties and establish its two equivalent characterizations, respectively, in terms of the spaces BMOA,\,max(X) and BMOA(X). Moreover, two variants of the John-Nirenberg inequality on BMOA(X) are obtained. As an application, the authors further prove that the space BMO(Rn), associated with the Poisson semigroup of the Laplace operator on Rn, coincides with the space BMO(Rn) introduced by L. D. Ky.