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An elementary approach to some rigidity theorems

Differential Geometry 2008-01-03 v1

Abstract

Using elementary comparison geometry, we prove: Let (M,g)(M,g) be a simply-connected complete Riemannian manifold of dimension 3\ge 3. Suppose that the sectional curvature KK satisfies 1s(r)K1 -1-s(r) \le K \le -1, where rr denotes distance to a fixed point in MM. If limr\rte2rs(r)=0\lim_{r \rt \infty} e^{2r}s(r) =0, then (M,g)(M,g) has to be isometric to Hn{\mathbb H}^n. The same proof also yields that if KK satisfies s(r)K0-s(r) \le K \le 0 where limr\rtr2s(r)=0\lim_{r \rt \infty} r^2s(r)=0, then (M,g)(M,g) is isometric to Rn\R^n, a result due to Greene and Wu. Our second result is a local one: Let (M,g)(M,g) be any Riemannian manifold. For aRa \in \R, if KaK \le a on a geodesic ball Bp(R)B_p(R) in MM and K=aK = a on Bp(R)\partial B_p(R), then K=aK= a on Bp(R)B_p(R).

Keywords

Cite

@article{arxiv.0801.0285,
  title  = {An elementary approach to some rigidity theorems},
  author = {Harish Seshadri},
  journal= {arXiv preprint arXiv:0801.0285},
  year   = {2008}
}

Comments

5 Pages

R2 v1 2026-06-21T09:58:45.424Z