A Necessary and Sufficient Condition for a Self-Diffeomorphism of a Smooth Manifold to be the Time-1 Map of the Flow of a Differential Equation
Abstract
In topological dynamics, one considers a topological space X and a self-map f: X X of X and studies the self-map's properties. In global analysis, one considers a smooth manifold Mn and a differential equation : M TM on M and studies the flow t: M × R M of the differential equation. In this paper, we consider a necessary and sufficient condition for a self-diffeomorphism f of a manifold M to be the time-1 map 1 of the flow of a differential equation on M.
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