Univalent function

For other uses, see Univalent.

In mathematics, in the branch of complex analysis, a holomorphic function on an open subset of the complex plane is called univalent if it is injective.^[1][2]

Examples

The function ${\displaystyle f\colon z\mapsto 2z+z^{2}}$  is univalent in the open unit disc, as ${\displaystyle f(z)=f(w)}$  implies that ${\displaystyle f(z)-f(w)=(z-w)(z+w+2)=0}$ . As the second factor is non-zero in the open unit disc, ${\displaystyle z=w}$  so ${\displaystyle f}$  is injective.

Basic properties

One can prove that if ${\displaystyle G}$  and ${\displaystyle \Omega }$  are two open connected sets in the complex plane, and

${\displaystyle f:G\to \Omega }$ 

is a univalent function such that ${\displaystyle f(G)=\Omega }$  (that is, ${\displaystyle f}$  is surjective), then the derivative of ${\displaystyle f}$  is never zero, ${\displaystyle f}$  is invertible, and its inverse ${\displaystyle f^{-1}}$  is also holomorphic. More, one has by the chain rule

${\displaystyle (f^{-1})'(f(z))={\frac {1}{f'(z)}}}$ 

for all ${\displaystyle z}$  in ${\displaystyle G.}$ 

Comparison with real functions

For real analytic functions, unlike for complex analytic (that is, holomorphic) functions, these statements fail to hold. For example, consider the function

${\displaystyle f:(-1,1)\to (-1,1)\,}$ 

given by ${\displaystyle f(x)=x^{3}}$ . This function is clearly injective, but its derivative is 0 at ${\displaystyle x=0}$ , and its inverse is not analytic, or even differentiable, on the whole interval ${\displaystyle (-1,1)}$ . Consequently, if we enlarge the domain to an open subset ${\displaystyle G}$  of the complex plane, it must fail to be injective; and this is the case, since (for example) ${\displaystyle f(\varepsilon \omega )=f(\varepsilon )}$  (where ${\displaystyle \omega }$  is a primitive cube root of unity and ${\displaystyle \varepsilon }$  is a positive real number smaller than the radius of ${\displaystyle G}$  as a neighbourhood of ${\displaystyle 0}$ ).

See also

• Biholomorphic mapping – Bijective holomorphic function with a holomorphic inversePages displaying short descriptions of redirect targets
• De Branges's theorem – Statement in complex analysis; formerly the Bieberbach conjecture
• Koebe quarter theorem – Statement in complex analysis
• Riemann mapping theorem – Mathematical theorem
• Nevanlinna's criterion – Characterization of starlike univalent holomorphic functions

Note

1. (Conway 1995, p. 32, chapter 14: Conformal equivalence for simply connected regions, Definition 1.12: "A function on an open set is univalent if it is analytic and one-to-one.")
2. (Nehari 1975)

References

• Conway, John B. (1995). "Conformal Equivalence for Simply Connected Regions". Functions of One Complex Variable II. Graduate Texts in Mathematics. Vol. 159. doi:10.1007/978-1-4612-0817-4. ISBN 978-1-4612-6911-3.
• "Univalent Functions". Sources in the Development of Mathematics. 2011. pp. 907–928. doi:10.1017/CBO9780511844195.041. ISBN 9780521114707.
• Duren, P. L. (1983). Univalent Functions. Springer New York, NY. p. XIV, 384. ISBN 978-1-4419-2816-0.
• Gong, Sheng (1998). Convex and Starlike Mappings in Several Complex Variables. doi:10.1007/978-94-011-5206-8. ISBN 978-94-010-6191-9.
• Jarnicki, Marek; Pflug, Peter (2006). "A remark on separate holomorphy". Studia Mathematica. 174 (3): 309–317. arXiv:math/0507305. doi:10.4064/SM174-3-5. S2CID 15660985.
• Nehari, Zeev (1975). Conformal mapping. New York: Dover Publications. p. 146. ISBN 0-486-61137-X. OCLC 1504503.

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