Rigidity of Area-Minimizing Hyperbolic Surfaces in Three-Manifolds

被引：27

作者：

Nunes, Ivaldo ^{[1
]}

机构：

[1] Inst Nacl Matemat Pura & Aplicada IMPA, BR-22460320 Rio De Janeiro, RJ, Brazil

来源：

JOURNAL OF GEOMETRIC ANALYSIS | 2013年 / 23卷 / 03期

关键词：

Minimal surfaces; Constant mean curvature surfaces; Scalar curvature; Rigidity; SCALAR CURVATURE RIGIDITY; MINIMAL-SURFACES; MASS; MANIFOLDS; EXISTENCE; PROOF;

D O I：

10.1007/s12220-011-9287-8

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

We prove that if M is a three-manifold with scalar curvature greater than or equal to -2 and I aS pound,M is a two-sided compact embedded Riemann surface of genus greater than 1 which is locally area-minimizing, then the area of I pound is greater than or equal to 4 pi(g(I )-1) pound, where g(I ) pound denotes the genus of I pound. In the equality case, we prove that the induced metric on I pound has constant Gauss curvature equal to -1 and locally M splits along I pound. We also obtain a rigidity result for cylinders (IxI pound,dt (2)+g (I )) pound, where I=[a,b]aS,a"e and g (I ) pound is a Riemannian metric on I pound with constant Gauss curvature equal to -1.

引用

页码：1290 / 1302

页数：13

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