We prove that if $T: X \to X$ is a selfmap of a set $X$ such that $\bigcap
\{T^{n}X: n\in N}\}$ is a one-point set, then the set $X$ can be endowed with a
compact Hausdorff topology so that $T$ is continuous.Comment: 5 page

Iwanik, A.

Janos, L.

Smith, F. A.

English

arXiv

We prove that if T: X → X is a selfmap of a set X such that ⋂ {TnX: n ∈ N} is a one-point set, then the set X can be endowed with a compact Hausdorff topology so that T is continuous

A. Iwanik

L. Janos

F. A. Smith

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COMPACTIFICATION OF A MAP WHICH IS MAPPED TO ITSELF

Compactification of a map which is mapped to itself

Compactification of a map which is mapped to itself

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