A generalized mean value inequality for subharmonic functions
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Publication:5939215
DOI10.1016/S0723-0869(01)80029-3zbMath0979.31002arXivmath/0302261MaRDI QIDQ5939215
Publication date: 24 February 2002
Published in: Expositiones Mathematicae (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/0302261
Related Items (13)
\(L^{p}\)-integrability of the maximal function of a polyharmonic function ⋮ LOWER BOUNDS ON LP QUASI‐NORMS AND THE UNIFORM SUBLEVEL SET PROBLEM ⋮ Subharmonic functions, generalizations, weighted boundary behavior, and separately subharmonic functions: a survey ⋮ Some properties of quasinearly subharmonic functions and maximal theorem for Bergman type spaces ⋮ Classes of quasi-nearly subharmonic functions ⋮ Quasi-nearly subharmonicity and separately quasi-nearly subharmonic functions ⋮ An Inequality Type Condition for Quasinearly Subharmonic Functions and Applications ⋮ MEAN VALUE TYPE INEQUALITIES FOR QUASINEARLY SUBHARMONIC FUNCTIONS ⋮ Littlewood-Paley theory for subharmonic functions on the unit ball in \(\mathbb R^N\) ⋮ Quasi-nearly subharmonic functions in locally uniformly homogeneous spaces ⋮ Subharmonic behavior and quasiconformal mappings ⋮ Embeddings of harmonic mixed norm spaces on smoothly bounded domains in \(\mathbb{R}^n\) ⋮ On quasinearly subharmonic functions
Cites Work
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- Inequalities for the gradient of eigenfunctions of the invariant Laplacian in the unit ball
- On a theorem of Avanissian-Arsove
- \(H^p\) spaces of several variables
- Nonintegrability of Superharmonic Functions
- Weighted tangential boundary limits of subharmonic functions on domains in ${R^n}$ ${(n\geq2)}$
- Subharmonic Behaviour of ‖H | p (p > 0, h HARMONIC)
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