Volume growth, capacity estimates, p-parabolicity and sharp integrability properties of p-harmonic Green functions
Björn, A., Björn, J., & Lehrbäck, J. (2023). Volume growth, capacity estimates, p-parabolicity and sharp integrability properties of p-harmonic Green functions. Journal d'Analyse Mathematique, 150(1), 159-214. https://doi.org/10.1007/s11854-023-0273-4
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Journal d'Analyse MathematiqueDate
2023Discipline
MatematiikkaAnalyysin ja dynamiikan tutkimuksen huippuyksikköMathematicsAnalysis and Dynamics Research (Centre of Excellence)Copyright
© Hebrew University Magnes Press; Springer 2023
In a complete metric space equipped with a doubling measure supporting a p-Poincaré inequality, we prove sharp growth and integrability results for p-harmonic Green functions and their minimal p-weak upper gradients. We show that these properties are determined by the growth of the underlying measure near the singularity. Corresponding results are obtained also for more general p-harmonic functions with poles, as well as for singular solutions of elliptic differential equations in divergence form on weighted Rn and on manifolds.
The proofs are based on a new general capacity estimate for annuli, which implies precise pointwise estimates for p-harmonic Green functions. The capacity estimate is valid under considerably milder assumptions than above. We also use it, under these milder assumptions, to characterize singletons of zero capacity and the p-parabolicity of the space. This generalizes and improves earlier results that have been important especially in the context of Riemannian manifolds.
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Hebrew University Magnes Press; SpringerISSN Search the Publication Forum
0021-7670Publication in research information system
https://converis.jyu.fi/converis/portal/detail/Publication/182288272
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Additional information about funding
A. B. and J. B. were supported by the Swedish Research Council, grants 2016-03424 resp., 621-2014-3974 and 2018-04106.License
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