Questions tagged [complex-analysis]

For questions mainly about theory of complex analytic/holomorphic functions of one complex variable. Use [tag:complex-numbers] instead for questions about complex numbers. Use [tag:several-complex-variables] instead for questions about holomorphic functions of more than one complex variables.

Complex analysis is a branch of mathematical analysis that investigates functions of one or several complex variables. Typical topics include Cauchy's integral formula, singularities, poles, holomorphic and meromorphic functions, Laurent and Taylor series, maximum modulus principle, isolated zeros principle, etc.

Independent variable and dependent variable of complex functions are both complex numbers, and may be separated into real (denoted by $\Re$) and imaginary parts (denoted by $\Im$) : $z = x +iy$ and $w = f(z) =u(x,y)+iv(x,y)$ where $x, y \in \mathbb{R}$, $u(x,y)$ and $v(x,y)$ being real-valued functions.

A fundamental result of complex analysis is the Cauchy-Riemann equations, which give the conditions for a function to have a complex derivative, which is a complex generalization of the (real) derivative. If the complex derivative is defined at each point in an open connected subset of $\mathbb C$, the function is called analytic, or holomorphic. If the complex derivative is defined at each point in $\mathbb C$, the function is called entire.

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Exercise 2. Chapter 5. Stein

Suppose $F(z)$ is holomorphic near $z=z_0$ and $F(z_0)=F'(z_0)=0$, while $F''(z_0)\neq 0$. Show that there are two curves $\Gamma_1$ and $\Gamma_2$ that pass through $z_0$, are orthogonal at $z_0$, and so that $F$ restricted to $\Gamma_1$ is real an…
Luz
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$f,\overline f$ are both analytic in a domain $\Omega$ then $f$ is constant?

is it true if $f,\overline f$ are both analytic in a domain $\Omega$ then $f$ is constant? I am not able to find out what property of holomorphic map I need to apply. please help.Thank you. $f(z)=u(x,y)+iv(x,y)$, $\bar{f}(z)=u(x,y)-iv(x,y)$
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Finding the number of solutions of a complex valued function $f(z) = z^n$

This past semester I took a graduate course in complex analysis which I completed moderately well in spite of my expectations (that is I honestly think I deserved a lower grade than I received). I had one assigned question which caused me to join…
Triatticus
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A linear holomorphic function

If $f$ is a holomorphic function on a simply connected open domain $\Omega$, and $f$ is a linear function on the boundary $\Omega$, i.e. $f=az+b$ on $\partial\Omega$. Then, can I say that $f$ is also linear function on $\Omega$?
David
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Complex $ \sqrt[n]{\cdot} $

Define $ b^{z}:=e^{\log\left(b\right)\cdot z} $, as a function of 2 complex variables $ (b,z) \in D(1,1)\times \mathbb{C} $ Where $log $ here is defined only on the disk $ D(1,1) $ and given by $$…
FreeZe
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Analogue of Cauchy Integral Formula to compute $f(a)$ in terms of $f(z)$, $z$ on $\gamma$, when $a$ is outside $\gamma$

Let $f:\Omega\to\mathbb C$ be holomorphic, where $\Omega$ is a simply connected domain. Suppose we know the values of $f$ on a simple closed curve $\gamma$ contained in $\Omega$. The Cauchy Integral Formula tells us how to calculate $f(a)$ for $a$…
tuna
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Find a holomorphic function which is also injection

Find a holomorphic function which is also injection such that $$\{z\in \mathbb C: \text{Re}z>0, \text{Im}z>0\} \mapsto \{z\in \mathbb C: |z|<1, \text{Im}z>0\}.$$ I think that I need two transformations: $$\{z\in \mathbb C: \text{Re}z>0,…
john1235
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What's wrong with my method for this integral?

So I have to solve $$\int_0^1\frac{1}{x^{2/3}(1-x)^{1/3}}dx.$$ To do this I made a branch cut from $z=0$ to $z=1$ and took the bone-shaped contour that straddles the real axis, going clockwise. Now on the line above the real axis, I took the angle…
Souroy
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Why $P(z)\text{sin}(z)+Q(z)\text{cos}(z)$ has only finitely many non-real zeroes?

Consider entire functions (defined and holomorphic on the whole complex plane) of the form: $$f(z)=P(z)\text{sin}(z)+Q(z)\text{cos}(z),$$ where $P(z)$ and $Q(z)$ are polynomials with real coefficients. They seem to always have only finitely many…
donaastor
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Conformal structure of regions of the complex plane and the ring of holomorphic functions

How is the conformal structure of regions of the complex plane determined by the integral domain of holomorphic functions defined on those regions? Thanks
user7485
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A certain passage in Carathéodory's book concerning analytic continuation

The fragment below is from the book 'Theory of functions of a complex variable', by Carathéodory. The situation is this. We have an analytic function $f(z)$ in some region $G_z\subset\mathbb{C}$. Then $G_w=f(G_z)$ is a region in the $w$-plane. We…
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Integrate: $\int_0^{\infty}\frac{\sinh (ax)}{\sinh x} \cos (bx) dx$

Q: If $|a|< 1$ and $b>0$, show that $$\int_0^{\infty}\frac{\sinh (ax)}{\sinh x} \cos (bx) dx = \frac{\pi \sin (\pi a)}{2 (\cos (\pi a)+\cosh (\pi b))}$$ I need to evaluate the above integral by method of contour. I tried to use this contour…
Mula Ko Saag
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Making a cube root function analytic on $\mathbb{C}\backslash [1,3]$

I am still not convinced by the post that the function$$\sqrt[3]{(z-1)(z-2)(z-3)}$$ can be defined so it is analytic on $\mathbb{C}\backslash [1,3]$. We define for each $z\in \mathbb{C}\backslash (-\infty,3]$ the function $$f(z)=\int_4^z…
TCL
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a problem on nonconstant holomorphic function has a zero or no in the closed unit disk

Let $f:D \to \mathbb{C}$ be a non-constant holomorphic function ($D$ is the closed unit disk) such that $|f(z)|=1$ for all $z$ satisfying $|z|=1$ . Then prove that there exist $z_0 \in D$ such that $f(z_0)=0$ My thought:- By Maximum Modulus Theorem…
poton
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Rational trigonometric integral

I am asked to show that $\int \limits_{0}^{2\pi} \frac{\sin(x)^2}{5+4\cos(x)} dx=\frac{\pi}{4}$. I substitute in $\sin(x)=\frac{1}{2i}(z-\frac{1}{z})$, $\cos(x)=\frac{1}{2}(z+\frac{1}{z})$ and $dx=\frac{1}{z i}dz$ to get: $\int_{|z|=1} \frac{i…
user39280