A priori upper bounds of solutions satisfying a certain differential inequality on complete manifolds
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Publication:925705
zbMath1139.53021MaRDI QIDQ925705
Publication date: 22 May 2008
Published in: Osaka Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://projecteuclid.org/euclid.ojm/1165850036
Elliptic equations on manifolds, general theory (58J05) Global Riemannian geometry, including pinching (53C20) Differential geometric aspects of harmonic maps (53C43) Methods of global Riemannian geometry, including PDE methods; curvature restrictions (53C21)
Related Items (4)
Maximum principles applied to translating solitons of the mean curvature flow in product spaces ⋮ Omori-Yau maximum principles, \(V\)-harmonic maps and their geometric applications ⋮ Product of almost-Hermitian manifolds ⋮ Default functions and Liouville type theorems based on symmetric diffusions
Cites Work
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- Function theory on manifolds which possess a pole
- Harmonic mappings from \(R^ m\) into an Hadamard manifold
- The Ahlfors-Schwarz lemma in several complex variables
- Elliptic differential inequalities with applications to harmonic maps
- Conformal immersions of complete Riemannian manifolds and extensions of the Schwarz lemma
- Scalar curvature and conformal deformations of noncompact Riemannian manifolds
- Volume growth, ``a priori estimates, and geometric applications
- On the Omori-Yau maximum principle and its applications to differential equations and geometry
- Isometric immersions of Riemannian manifolds
- A General Schwarz Lemma for Kahler Manifolds
- A Generalized Maximum Principle and its Applications in Geometry
- Differential equations on riemannian manifolds and their geometric applications
- A volume estimate for strong subharmonicity and maximum principle on complete Riemannian manifolds
- A note on divergence of $L^{p}$-integrals of subharmonic functions and its applications
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