A note on \(p\)-subharmonic functions on complete manifolds
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Publication:679468
DOI10.1007/BF02678198zbMath0873.31012MaRDI QIDQ679468
Maura Salvatori, Marco Vignati, Marco Rigoli
Publication date: 4 November 1997
Published in: Manuscripta Mathematica (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/156269
Other generalizations (nonlinear potential theory, etc.) (31C45) Potential theory on Riemannian manifolds and other spaces (31C12)
Related Items (7)
Harnack inequality for degenerate and singular operators of \(p\)-Laplacian type on Riemannian manifolds ⋮ On the $1/H$-flow by $p$-Laplace approximation: new estimates via fake distances under Ricci lower bounds ⋮ Harnack inequality for quasilinear elliptic equations on Riemannian manifolds ⋮ Qualitative properties of bounded subsolutions of nonlinear PDEs ⋮ A sharp \(L^q\)-Liouville theorem for \(p\)-harmonic functions ⋮ Volume growth, Green's functions, and parabolicity of ends ⋮ Harnack inequality and regularity of \(p\)-Laplace equation on complete manifolds
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- Volume growth and \(p\)-subharmonic functions on complete manifolds
- On the Omori-Yau maximum principle and its applications to differential equations and geometry
- Harnack's inequality for elliptic differential equations on minimal surfaces
- A note on the isoperimetric constant
- Heat Kernel Lower Bounds on Riemannian Manifolds Using the Old Ideas of Nash
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