Multiple brake orbits on compact convex symmetric reversible hypersurfaces in 2n

Abstract

In this paper, we prove that there exist at least [n+12]+1 geometrically distinct brake orbits on every C2 compact convex symmetric hypersurface in 2n for n 2 satisfying the reversible condition N= with N= (-In,In). As a consequence, we show that there exist at least [n+12]+1 geometrically distinct brake orbits in every bounded convex symmetric domain in n with n 2 which gives a positive answer to the Seifert conjecture of 1948 in the symmetric case for n=3. As an application, for n=4 and 5, we prove that if there are exactly n geometrically distinct closed characteristics on , then all of them are symmetric brake orbits after suitable time translation.