Complete negatively curved immersed ends in R3
Abstract
This paper extends, in a sharp way, the famous Efimov's Theorem to immersed ends in 3. More precisely, let M be a non-compact connected surface with compact boundary. Then there is no complete isometric immersion of M into R3 satisfying that ∫M |K|=+∞ and K-<0, where is a positive constant and K is the Gaussian curvature of M. In particular Efimov's Theorem holds for complete Hadamard immersed surfaces, whose Gaussian curvature K is bounded away from zero outside a compact set.
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