Victor Bangert scite author profile

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The existence of two closed geodesics on every Finsler 2-sphere

Bangert

2009

Math. Ann.

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On the Existence of Closed Geodesics on Two-Spheres

Bangert

1993

Int. J. Math.

123

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In [7] J. Franks proves the existence of infinitely many closed geodesics for every Riemannian metric on S2 which satisfies the following condition: there exists a simple closed geodesic for which Birkhoff's annulus map is defined. In particular, all metrics with positive Gaussian curvature have this property. Here we prove the existence of infinitely many closed geodesics for every Riemannian metric on S2 which has a simple closed geodesic for which Birkhoff's annulus map is not defined. Combining this with J. Franks's result and with the fact that every Riemannian metric on S2 has a simple closed geodesic one obtains the existence of infinitely many closed geodesics for every Riemannian metric on S2.

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A uniqueness theorem for Z n -periodic variational problems

Bangert

1987

Commentarii Mathematici Helvetici

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Victor Bangert

Mather Sets for Twist Maps and Geodesics on Tori

On minimal laminations of the torus

The existence of two closed geodesics on every Finsler 2-sphere

On the Existence of Closed Geodesics on Two-Spheres

A uniqueness theorem for Z n -periodic variational problems

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