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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$f$ holomorphic on $D\setminus \{0\}$ and takes no values in $(-\infty,0],$ then $0$ removable

If $f$ is holomorphic on $D\setminus \{0\}$ and takes no values in $(-\infty,0]$ then $0$ is a removable singularity. I thought to prove this by elimination, but I can't really tell anything about the behavior of $f$ around $0$. How can one…
Meitar
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Bijective holomorphic map

A bijective holomorphic map from unit disk to itself will be rotation? That mean $f(z)=e^{i\alpha}z$? How do I approach to solve this problem?In addition I want to know how one can remember the conformal maps which sends unit disk to upper half…
Myshkin
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Calculate $\sum_{n=0}^\infty$ $(n+1)(n+2)(\frac{i}{2})^{n-1}$

I want to calculate $\sum_{n=0}^\infty$ $(n+1)(n+2)(\frac{i}{2})^{n-1}$. I tried to separate it into a sum of real numbers ($n=0,2,4,\dots$) and complex numbers that are not real numbers ($n=1,3,5,\dots$) but it didn't work. So I did it another way,…
JAEMTO
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Constructing a holomorphic function with some specific points zero/nonzero

Given $n \in \mathbb{Z}$, is it possible to construct a holomorphic function $f : \mathbb{C} \rightarrow \mathbb{C}$ such that $f(n) \neq 0$, but for any integer $m \neq n$ we have $f(m)=0$? This is actually a homework problem in algebra which I…
Elena
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$\bar{\partial}$-Poincaré lemma

This is $\bar{\partial}$-Poincaré lemma: Given a holomorphic funtion $f:U\subset \mathbb{C} \to \mathbb{C}$ ,locally on $U$ there is a holomorphic function $g$ such that : $$\frac{\partial g}{\partial \bar z}=f$$ The author says that this is a local…
Jr.
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Prove that zeros of f are poles of 1/f

Let $f$ be analytic at $z=z_0$ and have a zero of $n$th order at $z=z_0$. Then $1/f(z)$ has a pole of $n$th order at $z=z_0$. I want to prove this, and for this I expand $f(z)$ as a power series, \begin{align*} f(z) = \sum_{k=0}^\infty c_k…
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Theorem of liouville

Consider two entire functions with no zeroes and having a ratio equal to unity at infinity. Use Liouville’s Theorem to show that they are in fact the same function. My attempt Consider $h(z) = f(z)/g(z)$. First of all, $h$ is entire, since $f$ and…
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Is path-connectedness same as connectedness in the complex plane?

In the book Complex Variables and Applications by Churchill page 32: An open set S is connected if each pair of points $z_1$ and $z_2$ in it can be joined by a polygonal line, consisting of a finite number of line segments joined end to end, that…
user231343
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The line integral $\int_{\gamma}\frac 1z$ and branchs of logarithm

Fix $w=re^{i\theta}\neq 0$ and let $\gamma$ be a rectifiable path in $\mathbb{C}\setminus\{0\}$ from $1$ to $w$. Show that there is a $k\in\mathbb{Z}$ such that $\displaystyle\int_{\gamma}\dfrac 1z=\log r+i\theta+2\pi i k$. If we could find some…
Tanius
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How is the function$ f\left ( z \right )=\left ( x^{3}+3xy^{2}-3x \right )+i\left ( y^{3}+3x^{2}y-3y \right )$ nowhere analytic

In a problem I've been doing it is stated to show that even though the function is differentiable along the coordinate axes, it is nowhere analytic. By definition, a function is differentiable if the following limit exists and is finite $$\lim…
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Find and Classify Singularities

Find and classify the singularities of the following functions in $\mathbb{C}$: $\frac{1}{z(e^{\frac{1}{z}}+1)}$ $\frac{1}{(z^2+1)(z-1)^2}-\frac{1}{4(z-i)}$ OK, so I think the first is the easier (perhaps). There's clearly an essential…
Mathmo
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Help with an integral $\int_0^{2 \pi} {d \theta \over (a + b \cos^2 \theta)^2}$

I need evaluate the following integral using residue theorem: With $a>0$ and $b>0$ $\int_0^{2 \pi} {d \theta \over (a + b \cos^2 \theta)^2}$ I have this: $\int_0^{2 \pi} {d \theta \over (a + b \cos^2 \theta)^2} = \int_{|z| = 1}{ {16z^4} \over{bz^4 +…
brbrbrbr
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Value of $1+4\omega+9\omega^{2}+\cdot\cdot\cdot +n ^{2}\omega^{n-1}$

How to find the value of $$1+4\omega+9\omega^{2}+\cdot\cdot\cdot +n ^{2}\omega^{n-1}$$ where $\omega$ is a primitive $n$th root of unity? I am trying to find the value using the fact that $$1+\omega+\omega^{2}+\cdot+\cdot\cdot+\omega^{n-1}=0$$ but…
neelkanth
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How to show if a complex function is analytic?

Just began the study of complex analysis. Let $$ f(x,y) = x^2 - y^2 + 2 i xy - x - iy. $$ I need to determine if this function is analytic. This means I have to show the partials satisfy the Cauchy-Riemann equations, and that the partials are…
Kamil
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