Myers's theorem - Misplaced Pages

(Redirected from Myers theorem) Bounds the length of geodetic segments in Riemannian manifolds based in Ricci curvature

Myers's theorem, also known as the Bonnet–Myers theorem, is a celebrated, fundamental theorem in the mathematical field of Riemannian geometry. It was discovered by Sumner Byron Myers in 1941. It asserts the following:

Let

(M,g)

be a complete and connected Riemannian manifold of dimension

n

whose Ricci curvature satisfies for some fixed positive real number

r

the inequality

\operatorname {Ric} _{p}(v)\geq (n-1){\frac {1}{r^{2}}}

for every

p\in M

and

v\in T_{p}M

of unit length. Then any two points of M can be joined by a geodesic segment of length at most

\pi r

In the special case of surfaces, this result was proved by Ossian Bonnet in 1855. For a surface, the Gauss, sectional, and Ricci curvatures are all the same, but Bonnet's proof easily generalizes to higher dimensions if one assumes a positive lower bound on the sectional curvature. Myers' key contribution was therefore to show that a Ricci lower bound is all that is needed to reach the same conclusion.

Corollaries

The conclusion of the theorem says, in particular, that the diameter of $(M,g)$ is finite. Therefore $M$ must be compact, as a closed (and hence compact) ball of finite radius in any tangent space is carried onto all of $M$ by the exponential map.

As a very particular case, this shows that any complete and noncompact smooth Riemannian manifold which is Einstein must have nonpositive Einstein constant.

Since $M$ is connected, there exists the smooth universal covering map $\pi :N\to M.$ One may consider the pull-back metric πg on $N.$ Since $\pi$ is a local isometry, Myers' theorem applies to the Riemannian manifold (N,πg) and hence $N$ is compact and the covering map is finite. This implies that the fundamental group of $M$ is finite.

Cheng's diameter rigidity theorem

The conclusion of Myers' theorem says that for any $p,q\in M,$ one has d_g(p,q) ≤ π/√k. In 1975, Shiu-Yuen Cheng proved:

Let $(M,g)$ be a complete and smooth Riemannian manifold of dimension n. If k is a positive number with Ric ≥ (n-1)k, and if there exists p and q in M with d_g(p,q) = π/√k, then (M,g) is simply-connected and has constant sectional curvature k.

References

Ambrose, W. A theorem of Myers. Duke Math. J. 24 (1957), 345–348.
Cheng, Shiu Yuen (1975), "Eigenvalue comparison theorems and its geometric applications", Mathematische Zeitschrift, 143 (3): 289–297, doi:10.1007/BF01214381, ISSN 0025-5874, MR 0378001
do Carmo, M. P. (1992), Riemannian Geometry, Boston, Mass.: Birkhäuser, ISBN 0-8176-3490-8
Myers, S. B. (1941), "Riemannian manifolds with positive mean curvature", Duke Mathematical Journal, 8 (2): 401–404, doi:10.1215/S0012-7094-41-00832-3

Manifolds (Glossary)

Basic concepts

Main results (list)

Maps

Types of
manifolds

Tensors

Vectors	Distribution Lie bracket Pushforward Tangent space bundle Torsion Vector field Vector flow
Covectors	Closed/Exact Covariant derivative Cotangent space bundle De Rham cohomology Differential form Vector-valued Exterior derivative Interior product Pullback Ricci curvature flow Riemann curvature tensor Tensor field density Volume form Wedge product
Bundles	Adjoint Affine Associated Cotangent Dual Fiber (Co) Fibration Jet Lie algebra (Stable) Normal Principal Spinor Subbundle Tangent Tensor Vector
Connections	Affine Cartan Ehresmann Form Generalized Koszul Levi-Civita Principal Vector Parallel transport

Generalizations

Categories:

Corollaries

Cheng's diameter rigidity theorem

See also

References