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In [[general topology]], an '''open map''' is a [[function (mathematics)|function]] on a [[topological space]] which maps every [[open set]] in the domain to an open set in the image.
In [[general topology]], an '''open map''' is a [[function (mathematics)|function]] on a [[topological space]] which maps every [[open set]] in the domain to an open set in the image.


A [[homeomorphism]] may be defined as a [[continuous map|continuous]] open [[bijection]].
A [[homeomorphism]] may be defined as a [[continuous map|continuous]] open [[bijection]].
==Open mapping theorem==
The '''open mapping theorem''' states that under suitable conditions a differentiable function may be an open map.
''Open mapping theorem for real functions''.  Let ''f'' be a function from an open domain ''D'' in '''R'''<sup>''n''</sup> to '''R'''<sup>''n''</sup> which is differentiable and has [[non-singular map|non-singular]] [[Derivative#Multivariable calculus|derivative]] [[non-singular map|non-singular]] in ''D''.  Then ''f'' is an open map on ''D''.
''Open mapping theorem for complex functions''.  Let ''f'' be a non-constant [[holomorphic function]] on an open domain ''D'' in the [[complex plane]].  Then ''f'' is an open map on ''D''.


==References==
==References==
* {{cite book | author=J.L. Kelley | authorlink=John L. Kelley | title=General topology | publisher=van Nostrand | year= 1955 | pages=90 }}
* {{cite book | author=Tom M. Apostol | title=Mathematical Analysis | edition=2nd ed | publisher=Addison-Wesley | year=1974 | pages=371,454 }}
* {{cite book | author=J.L. Kelley | authorlink=John L. Kelley | title=General topology | publisher=van Nostrand | year= 1955 | pages=90 }}[[Category:Suggestion Bot Tag]]

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In general topology, an open map is a function on a topological space which maps every open set in the domain to an open set in the image.

A homeomorphism may be defined as a continuous open bijection.

Open mapping theorem

The open mapping theorem states that under suitable conditions a differentiable function may be an open map.

Open mapping theorem for real functions. Let f be a function from an open domain D in Rn to Rn which is differentiable and has non-singular derivative non-singular in D. Then f is an open map on D.

Open mapping theorem for complex functions. Let f be a non-constant holomorphic function on an open domain D in the complex plane. Then f is an open map on D.

References

  • Tom M. Apostol (1974). Mathematical Analysis, 2nd ed. Addison-Wesley, 371,454. 
  • J.L. Kelley (1955). General topology. van Nostrand, 90.