Frédéric Bernicot
Published 2008-09-24Version 1
This paper can be considered as the sequel of [6], where the authors have proposed an abstract construction of Hardy spaces H^1. They shew an interpolation result for these Hardy spaces with the Lebesgue spaces. Here we describe a more precise result using the real interpolation theory and we clarify the use of Hardy spaces. Then with the help of the bilinear interpolation theory, we then give applications to study bilinear operators on Lebesgue spaces. These ideas permit us to study singular operators with singularities similar to those of bilinear Calderon-Zygmund operators in a far more abstract framework as in the euclidean case.
Localized Hardy Spaces $H^1$ Related to Admissible Functions on RD-Spaces and Applications to Schrödinger Operators
Radial Maximal Function Characterizations of Hardy Spaces on RD-Spaces and Their Applications
Localized Morrey-Campanato Spaces on Metric Measure Spaces and Applications to Schrödinger Operators
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