Quasi-open map

In topology a branch of mathematics, a quasi-open map or quasi-interior map is a function which has similar properties to continuous maps. However, continuous maps and quasi-open maps are not related.^[1].

[edit] Definition

A function $f : X \to Y$ between topological spaces $X$ and $Y$ is quasi-open if, for any non-empty open set $U \subset X$ , the interior of $f(U)$ in $Y$ is non-empty.^[1]^[2]

[edit] Properties

Let $f: X \to Y$ be a function such that X and Y are topological spaces.

If $f$ is continuous, it need not be quasi-open. Conversely if $f$ is quasi-open, it need not be continuous.^[1]
If $f$ is open, then $f$ is quasi-open.^[1]
If $f$ is a local homeomorphism, then $f$ is quasi-open.^[1]
If $f: X \to Y$ and $g: Y \to Z$ are both quasi-open (such that all spaces are topological), then the function composition $h = g \circ f: X \to Z$ is quasi-open.^[1]

[edit] References

^ ^a ^b ^c ^d ^e ^f Kim, Jae Woon (1998). "A Note on Quasi-Open Maps" (pdf). Journal of the Korean Mathematical Society. B: The Pure and Applied Mathematics 5 (1): 1–3. http://icms.kaist.ac.kr/mathnet/kms_tex/50115.pdf. Retrieved October 20, 2011.
^ Blokh, A.; Oversteegen, L.; Tymchatyn, E.D. (2006). "On almost one-to-one maps". Trans. Amer. Math. Soc.

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[Kim-0] ^ ^a ^b ^c ^d ^e ^f Kim, Jae Woon (1998). "A Note on Quasi-Open Maps" (pdf). Journal of the Korean Mathematical Society. B: The Pure and Applied Mathematics 5 (1): 1–3. http://icms.kaist.ac.kr/mathnet/kms_tex/50115.pdf. Retrieved October 20, 2011.

[1] Blokh, A.; Oversteegen, L.; Tymchatyn, E.D. (2006). "On almost one-to-one maps". Trans. Amer. Math. Soc.

[1]

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Quasi-open map

[edit] Definition

[edit] Properties

[edit] References

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