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The distance of L∞ from BMO on metric measure spaces
-
Juha Kinnunen
and
Parantap Shukla
Published/Copyright:
May 15, 2014
Abstract.
This work has two principal aims. The first is to obtain a characterization of the closure of
L∞ as a subset of BMO in the setting of metric measure spaces. The second is to
examine the issue of whether the Muckenhoupt class A1 is strictly contained in
Funding source: Academy of Finland
Received: 2014-4-1
Revised: 2014-4-25
Accepted: 2014-4-26
Published Online: 2014-5-15
Published in Print: 2014-6-1
© 2014 by Walter de Gruyter Berlin/Boston
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Articles in the same Issue
- Frontmatter
- Generalized super-relaxed proximal point algorithms involving relative A-maximal relaxed accretive in Banach spaces
- Iteration schema for common fixed points of nonlinear mappings in spaces of nonpositive curvature
- Spectrum of quantum dynamical systems: Subsystems and entropy
- Characterizations of a special family of Hq-semiclassical orthogonal q-polynomials of class one
- Comparison of solutions of Boussinesq systems
- The distance of L∞ from BMO on metric measure spaces
Keywords for this article
Muckenhoupt weights;
bounded mean oscillation;
reverse Hölder inequalities
Articles in the same Issue
- Frontmatter
- Generalized super-relaxed proximal point algorithms involving relative A-maximal relaxed accretive in Banach spaces
- Iteration schema for common fixed points of nonlinear mappings in spaces of nonpositive curvature
- Spectrum of quantum dynamical systems: Subsystems and entropy
- Characterizations of a special family of Hq-semiclassical orthogonal q-polynomials of class one
- Comparison of solutions of Boussinesq systems
- The distance of L∞ from BMO on metric measure spaces
