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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Angle between two curves at infinity?

In complex analysis, how would I find the angle between the two curves $f(z)=0$ and $g(z)=0$ at $\infty$? My guess would be that we would let $w=\frac{1}{z}$ and find the angle between the two curves at $w=0$ but if this is right would it work in…
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Another proof of Liouville's theorem.

Let $f(z)=\sum_{n} a_n z^n$ has radius of convergence $R>0$ and $0
mea43
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Residue of $f(z) = \frac{z}{1-\cos(z)}$ at $z=0$

I've been self-studying some complex variables and just started on residues. I'm looking at a problem where I've been asked to calculate the residue of: $$f(z) = \frac{z}{1-\cos(z)}$$ at $z=0$. I'm not really sure how to find the Laurent series of…
dayar
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entire function is constant

Let $ f $ a complex entire function such that: $$ |f(z)| \leq \sqrt{2|z|} + \frac{1}{\sqrt{2|z|}} \quad \forall z \neq 0 $$ Prove that $ f$ is constant. Thank's in advance!
passenger
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How exactly does writing $f(z)=f(z,\bar{z})$ work?

I know that we can just define the differential operators $$\frac{\partial}{\partial z} = \frac{1}{2}(\frac{\partial}{\partial x} - i \frac{\partial}{\partial y})$$ $$\frac{\partial}{\partial \bar{z}} = \frac{1}{2}(\frac{\partial}{\partial x} + i…
user2520938
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Schwarz Lemma - like exercise

There's this exercise: let $\,f\,$ be analytic on $$D:=\{z\;\;;\;\;|z|<1\}\,\,,\,|f(z)|\leq 1\,\,,\,\,\forall\,z\in D$$ and $\,z=0\,$ a zero of order $\,m\,$ of $\,f\,$. Prove that $$\forall z\in D\,\,,\,\,|f(z)|\leq |z|^m$$ My solution: Induction…
DonAntonio
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If there is a branch of $\sqrt{z}$ on an open set $U$ with $0 \notin U,$ then there is also a branch of $arg$ $z.$

Show that if there is a branch of $\sqrt{z}$ on an open set $U$ with $0 \notin U,$ then there is also a branch of $arg$ $z.$ I am unable to proceed any further in this and any help in this regard would be greatly appreciated.
mea43
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Morera's theorem, Conway's proof

I have a question about the proof of Morera's theorem as presented in Conway's text volume I. Let $G$ be a region and let $ f:G \to \mathbb{C} $ be a continuous function. Fix $ z_o$ in $G$. Then for any $z \in G$, let $[z_o,z]$ denote a line…
Khoa ta
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Existence of bounded analytic function on unbounded domain?

Given any proper open connected unbounded set $U$ in $\mathbb C$.Does there always exist a non constant bounded analytic function $ f\colon U \to \mathbb C$ ? Edit: $U$ is any arbitrary domain. I don't have idea to do it. Please help.
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Is $\frac{z-\alpha}{1-\overline{\alpha}z}$ some special function in complex analysis?

Many homework problems seem to use the following function (or something very close to it): $$F_\alpha(z)=\frac{z-\alpha}{1-\overline{\alpha}z}$$ Does it serve some special purposes in complex analysis? It does revolve around the unit circle.
mavavilj
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Error on a complex analysis qualifying exam?

Let $f(z) = \sum_{n = 0}^\infty c_n z^n$ for $\left| z \right| < R$. The problem as stated. For all $r < R$, $$\int_{\left\{ |z| = r \right\}} \left| f(z) \right|^2 \, dz = 2\pi \sum_{n=0}^\infty \left| c_n \right|^2 r^{2n}. $$ What I think…
Doug
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Show $z e^{\lambda-z}-1$ has only one real root in the unit disk.

$z e^{\lambda-z}-1$ has only one real root in the unit disk for all real $\lambda >1$ Usin calculus, I showed there is a root, but I can't see how I can use Rouche's theorem. I tried dividing and adding the different parts but it gets me nowhere.…
Meitar
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Which options are true for $f(z)=\frac{1}{z}$

Consider $f(z)=\frac{1}{z}$ on the annulus $A= \{z\in \Bbb{C} | \frac{1}{2}<|z|<2\}$. Which of the following are true? There is a sequence $\{p_n(z)\}$ of polynomials that approximate $f(z)$ uniformly on compact subsets of $A$. There is a sequence…
Savannah
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Apparent Contradiction to Liouville's Theorem

The function of a real variable defined by $f(x)=\sin(x)$ is analytic everywhere and bounded because $|\sin(x)|\leqslant 1$ for all $x$ but it is certainly not a constant. Should this contradict Liouville's theorem? Why is it not a contradiction?
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Location of roots of degree six complex polynomial

I want to prove that $z^6 +192 z + 640 =0$ has one root in the first and fourth quadrants and two roots in the second and third quadrants. How can I do this? I have tried some ideas like using Vieta's formulas, but still no result.