释义 |
NonwanderingA point in a Manifold is said to be nonwandering if, for every open Neighborhood of , it is truethat for a Map for some . In other words, every point close to hassome iterate under which is also close to . The set of all nonwandering points is denoted , which isknown as the nonwandering set of . See also Anosov Diffeomorphism, Axiom A Diffeomorphism, Smale Horseshoe Map
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