CRN 12109: HW 5

Revision as of 08:50, 18 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.

Revision as of 17:47, 15 October 2013 (view source) HelmutKnaust (Talk \| contribs) ← Older edit		Revision as of 08:50, 18 October 2013 (view source) HelmutKnaust (Talk \| contribs) Newer edit →
Line 12:		Line 12:


−	'''Problem 25.''' A set $X$ is called ''LP-compact'', if every infinite subset $A$ of $X$ has a limit point belonging to $A$.	+	'''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.		Show that a set is LP-compact if and only if it is closed and bounded.