Weighted BMO spaces associated to operators

Abstract

Let X be a metric space equipped with a metric d and a nonnegative Borel measure μ satisfying the doubling property and let \At\t>0, be a generalized approximations to the identity, for example \At\ is a holomorphic semigroup e-tL with Gaussian upper bounds generated by an operators L on L2(X). In this paper, we introduce and study the weighted BMO space BMOA(X,w) associated to the the family \At\. We show that for these spaces, the weighted John-Nirenberg inequality holds and we establish an interpolation theorem in scale of weighted Lp spaces. As applications, we prove the boundedness of two singular integrals with non-smooth kernels on the weighted BMO space BMOA(X,w)$.