Univalent function

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 one-to-one.

Examples

Any mapping $phi_a$ of the open unit disc to itself, : $phi_a(z) =frac{z-a}{1 - ar{a}z},$ where $|a|le 1,$ is univalent.

Basic properties

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

: $f: G o Omega$

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

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

for all $z$ in $G.$

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

: $f: (-1, 1) o (-1, 1)$

given by $f(x)=x^3$ . This function is clearly one-to-one, however, its derivative is 0 at $x=0$ , and its inverse is not analytic, or even differentiable, on the whole interval $(-1, 1).$

References

* John B. Conway. "Functions of One Complex Variable I". Springer-Verlag, New York, 1978. ISBN 0-387-90328-3.

* John B. Conway. "Functions of One Complex Variable II". Springer-Verlag, New York, 1996. ISBN 0-387-94460-5.

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