Multiple closed geodesics on Finsler 3-dimensional sphere
Abstract
In 1973, Katok constructed a non-degenerate (also called bumpy) Finsler metric on S3 with exactly four prime closed geodesics. And then Anosov conjectured that four should be the optimal lower bound of the number of prime closed geodesics on every Finsler S3. In this paper, we proved this conjecture for bumpy Finsler S3 if the Morse index of any prime closed geodesic is nonzero.
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