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<div>In [[mathematical analysis]], the word '''''region''''' usually refers to a subset of <math>\R^n</math> or <math>\C^n</math> that is [[open set|open]] (in the standard [[Euclidean topology]]), [[connected set|connected]] and [[empty set|non-empty]]. A '''closed region''' is sometimes defined to be the [[closure (topology)|closure]] of a region.<br />
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Regions and closed regions are often used as domains of functions or differential equations.<br />
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According to Kreyszig,<ref>[[Erwin Kreyszig]] (1993) ''Advanced Engineering Mathematics'', 7th edition, p. 720, [[John Wiley & Sons]], ISBN 0-471-55380-8</ref><br />
:A region is a set consisting of a [[domain (mathematical analysis)|domain]] plus, perhaps, some or all of its boundary points. (The reader is warned that some authors use the term "region" for what we call a domain [following standard terminology], and others make no distinction between the two terms.)<br />
According to Yue Kuen Kwok,<br />
:An open connected set is called an ''open region'' or ''domain''. ...to an open region we may add none, some, or all its [[limit point]]s, and simply call the new set a ''region''.<ref>Yue Kuen Kwok (2002) ''Applied Complex Variables for Scientists and Engineers'', § 1.4 Some topological definitions, p 23, [[Cambridge University Press]], ISBN 0-521-00462-4</ref><br />
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==See also==<br />
* [[Jordan curve theorem]]<br />
* [[Riemann mapping theorem]]<br />
* [[Domain (mathematical analysis)]]<br />
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==Notes and references==<br />
{{Reflist}}<br />
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* Ruel V. Churchill (1960) ''Complex variables and applications'', 2nd edition, §1.9 Regions in the complex plane, pp. 16 to 18, [[McGraw-Hill]]<br />
* [[Constantin Carathéodory]] (1954) ''Theory of Functions of a Complex Variable'', v. I, p. 97, [[Chelsea Publishing]].<br />
* [[Howard Eves]] (1966) ''Functions of a Complex Variable'', p. 105, Prindle, Weber & Schmidt.<br />
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[[Category:Mathematical analysis]]<br />
[[Category:Topology]]</div>114.202.164.22