Complete surfaces with negative extrinsic curvature

Abstract

N. V. Efimov Ef1 proved that there is no complete, smooth surface in 3 with uniformly negative curvature. We extend this to isometric immersions in a 3-manifold with pinched curvature: if M3 has sectional curvature between two constants K2 and K3, then there exists K1 < (K2, 0) such that M contains no smooth, complete immersed surface with curvature below K1. Optimal values of K1 are determined. This results rests on a phenomenon of propagations for degenerations of solutions of hyperbolic Monge-Amp\`ere equations.

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