Seifert conjecture in the even convex case
Abstract
In this paper, we prove that there exist at least n geometrically distinct brake orbits on every C2 compact convex symmetric hypersurface in 2n satisfying the reversible condition N= with N= (-In,In). As a consequence, we show that if the Hamiltonian function is convex and even, then Seifert conjecture of 1948 on the multiplicity of brake orbits holds for any positive integer n.
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