The number of periodic points of surface symplectic diffeomorphisms
Abstract
We use symplectic tools to establish a smooth variant of Franks theorem for a closed orientable surface of positive genus g; it implies that a symplectic diffeomorphism isotopic to the identity with more than 2g-2 fixed points, counted homologically, has infinitely many periodic points. Furthermore, we present examples of symplectic diffeomorphisms with a prescribed number of periodic points. In particular, we construct symplectic flows on surfaces possessing only one fixed point and no other periodic orbits.
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