The annular decay property and capacity estimates for thin annuli
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Publication:2364373
DOI10.1007/S13348-016-0178-YzbMath1375.31017arXiv1512.06577OpenAlexW2275331536WikidataQ109744311 ScholiaQ109744311MaRDI QIDQ2364373
Juha Lehrbäck, Anders Björn, Jana Björn
Publication date: 19 July 2017
Published in: Collectanea Mathematica (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1512.06577
Potentials and capacities on other spaces (31C15) Other generalizations (nonlinear potential theory, etc.) (31C45) Potential theory on fractals and metric spaces (31E05) Analysis on metric spaces (30L99)
Related Items (10)
Sharp capacity estimates for annuli in weighted \(\mathbf {R}^n\) and in metric spaces ⋮ A note on metric-measure spaces supporting Poincaré inequalities ⋮ Fractional maximal functions and mean oscillation on bounded doubling metric measure spaces ⋮ Volume growth, capacity estimates, \(p\)-parabolicity and sharp integrability properties of \(p\)-harmonic Green functions ⋮ Admissibility versus \(A_p\)-conditions on regular trees ⋮ A priori Hölder and Lipschitz regularity for generalized \(p\)-harmonious functions in metric measure spaces ⋮ Local and semilocal Poincaré inequalities on metric spaces ⋮ Geometric characterizations of Hölder-continuous quasi-distances and applications ⋮ On a class of singular measures satisfying a strong annular decay condition ⋮ Generalized Modes in Bayesian Inverse Problems
Cites Work
- Distribution of points and Hardy type inequalities in spaces of homogeneous type
- Nonlinear potential theory on metric spaces
- Opérateurs de Calderón-Zygmund, fonctions para-accrétives et interpolation. (Calderón-Zygmund operators, para-accretive functions and interpolation)
- Quasiconformal maps in metric spaces with controlled geometry
- Lectures on analysis on metric spaces
- Newtonian spaces: An extension of Sobolev spaces to metric measure spaces
- Sharp capacity estimates for annuli in weighted \(\mathbf {R}^n\) and in metric spaces
- The variational capacity with respect to nonopen sets in metric spaces
- Liouville theorems for harmonic sections and applications
- Sobolev Spaces on Metric Measure Spaces
- Harmonic functions on metric spaces
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