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Título: Hardy Space Associated To Non-Negative Self-Adjoint Operators Satisfying Davies- | |
| Autor: Bonato, Anthony; Nowakowski, Richard J. | Precio: $918.00 | |
| Editorial: American Mathematical Society | Año: 2011 | |
| Tema: Matematicas | Edición: 1ª | |
| Sinopsis | ISBN: 9780821852385 | |
| Let X be a metric space with doubling measure, and L be a non-negative, self-adjoint operator satisfying Davies-Gaffney bounds on L2(X). In this article the authors present a theory of Hardy and BMO spaces associated to L, including an atomic (or molecular) decomposition, square function characterization, and duality of Hardy and BMO spaces. Further specializing to the case that L is a Schrödinger operator on Rn with a non-negative, locally integrable potential, the authors establish additional characterizations of such Hardy spaces in terms of maximal functions. Finally, they define Hardy spaces HpL(X) for p>1, which may or may not coincide with the space Lp(X), and show that they interpolate with H1L(X) spaces by the complex method. | ||
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