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recurrent point of

Let a continuum

and a mapping $f: X \to X$$ be given. For each natural number

denote by

the

-th iteration of

. A point $p \in X$$ is called a recurrent point of

provided that for every neighborhood

there is $n \in \mathbb{N}$$ such that $f^n(p) \in U$$ . The set of recurrent points of a mapping $f: X \to X$$ are denoted by

Next: refinable (monotonely) Up: Definitions Previous: real curve

Janusz J. Charatonik, Pawel Krupski and Pavel Pyrih
2001-11-30