A Remark on the Omori-Yau Maximum Principle
Abstract
A Riemannian manifold M is said to satisfy the Omori-Yau maximum principle if for any C2 bounded function g:M R there is a sequence xn∈ M, such that n ∞g(xn)=M g, n ∞|∇ g(xn)|=0 and n ∞ g(xn)≤ 0. It is shown that if the Ricci curvature does not approach -∞ too fast the manifold satisfies the Omori-Yau maximum principle. This improves earlier necessary conditions. The given condition is quite optimal.
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