CRN 12109: HW 5

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Show that a set is LP-compact if and only if it is closed and bounded.
 
Show that a set is LP-compact if and only if it is closed and bounded.
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Hint: Show first that every bounded infinite set has a limit point.

Latest revision as of 14:58, 24 October 2013

Problem 21. Exercise 3.2.2 (a-d)


Problem 22. Given a set $X$ of real numbers, let $L$ be the set of all limit points of $X$. Show that $L$ is closed.


Problem 23. Show: If $X$ is both open and closed, then $X={\mathbb R}$ or $X=\emptyset$.


Problem 24. Exercise 3.2.14


Problem 25. A set $X$ is called LP-compact, if every infinite subset $A$ of $X$ has a limit point belonging to $X$.

Show that a set is LP-compact if and only if it is closed and bounded.

Hint: Show first that every bounded infinite set has a limit point.

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