Abstract
In this paper we prove the persistence of invariant tori of analytic reversible systems under Brjuno–Russmann’s non-resonant condition by an improved KAM iteration, but the frequency may undergo some drift. Furthermore, if the frequency mapping has nonzero Brouwer’s topological degree, then the invariant torus with prescribed frequency can persist. In the proof we propose a new method of KAM iteration for reversible systems, containing an artificial parameter \(q, 0< q <1, \) which makes the steps of KAM iteration infinitely small in the speed of the function \(q^{n}\epsilon \) rather than super exponential function \(\epsilon ^{\lambda ^{n}}, 1<\lambda <2\).
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