ON MINIMAL SURFACES SATISFYING THE OMORI–YAU PRINCIPLE
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Publication:3021153
DOI10.1017/S0004972711002346zbMath1220.53071MaRDI QIDQ3021153
Publication date: 22 July 2011
Published in: Bulletin of the Australian Mathematical Society (Search for Journal in Brave)
Related Items (2)
Bi-Halfspace and Convex Hull Theorems for Translating Solitons ⋮ Spectral and stochastic properties of the \(f\)-Laplacian, solutions of PDEs at infinity and geometric applications
Cites Work
- Good shadows, dynamics and convex hulls of complete submanifolds
- The strong halfspace theorem for minimal surfaces
- Convex hulls of complete minimal surfaces
- On the Omori-Yau maximum principle and its applications to differential equations and geometry
- The Calabi-Yau conjectures for embedded surfaces
- Complete proper minimal surfaces in convex bodies of \(\mathbb R^3\). II: The behavior of the limit set
- Isometric immersions of Riemannian manifolds
- Bounded domains which are universal for minimal surfaces
- IMMERSION OF MANIFOLDS WITH UNBOUNDED IMAGE AND A MODIFIED MAXIMUM PRINCIPLE OF YAU
- A General Schwarz Lemma for Kahler Manifolds
- An Estimate for the Curvature of Bounded Submanifolds
- Harmonic functions on complete riemannian manifolds
- On the asymptotic behavior of a complete bounded minimal surface in ℝ³
- Hadamard's and Calabi-Yau's conjectures on negatively curved and minimal surfaces
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