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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Domination of complex-value polynomial by highest power.

The problem: Let $P(n)$ be a polynomial of degree $n$. Let $$M(r):= \underset{|z|\le r}{\mbox{sup}} \hspace{2mm} \left|P(z)\right|.$$ I desire to establish that $$r\mapsto \frac{M(r)}{r^n}$$ for $r>0$ is non-increasing as a function of $r$. At least…
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$\lim\limits_{|z| \to \infty} f(z) = \infty$, show that $f$ is a polynomial.

I had an approach to the following problem which now I'm not sure will work: If $f$ is entire, and $\lim\limits_{z \to \infty} f(z) = \infty$, show that $f$ is a polynomial. Case 1: there exist $C > 0, N \in \mathbb{N}$ such that $|f(z)| \leq C…
D_S
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Does a branch of a square root determine a branch of a logarithm?

Suppose I have a branch of the logarithm, that is, a continuous function $L(z)$ on some region $\Omega$ such that $e^{L(z)} = z$. We see that this defines a branch for the square root function on $\Omega$, via $\sqrt{z} = \exp(1/2 L(z))$, since…
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The Integral of a Harmonic Function

Show that: $$\frac{1}{2\pi}\int_0^{2\pi}\log|re^{i\theta} - z_0|d\theta = \begin{cases} \log|z_0| & if & |z_0| < r \\ \log|r| & if & |z_0| > r \end{cases}.$$ I know $\log|z|$ is a harmonic function in the slit plane since it is the real part of…
Set
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Show: An entire function $g$ with $\vert g(x) \vert \to \infty$ for $|x| \to \infty$ is a polynomial.

This is part of an exercise sheet in complex analysis. It should by solvable by rather elementary methods like the main theorems of complex analysis. I succeded to show that $g$ has only finitely many zeros by using Bolzano-Weierstraß's theorem. If…
Zardo
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Cauchy Riemann equations and analyticity of a function

A At which points if any does the function $$f(z) = z\operatorname{Re}(z) + \bar{z}\operatorname{Im}(z)$$ satisfy the Cauchy-Riemann equations? B At which points, if any is this function analytic. Justify your answer. Answer A. I applied the Cauchy…
Jim_CS
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Let $P$ be a complex polynomial such that $z \in \mathbb{R} \iff P(z) \in \mathbb{R}$. Show that $deg P = 1$

I need some help with the following question: Let $P$ be a complex polynomial such that $z \in \mathbb{R} \iff P(z) \in \mathbb{R}$. Show that $deg P = 1$ There's also a hint: Define $P = u+iv$ and show that either $v_y \le 0$ or $v_y \ge 0$ on the…
amirbd89
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Showing $\sin(\bar{z})$ is not analytic at any point of $\mathbb{C}$

Use the Cauchy-Riemann equations to show that the function $$g(z) = \sin (\bar z)$$ is not analytic at any point of $\mathbb{C}$. Here's as far as I got - $$\sin \left(\frac{\bar z}{1}.\frac{z}{z}\right) =\sin \left(\frac{|z|^2}{z}\right) =\sin…
Jim_CS
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Unique Entire Function with Prescribed Values

Problem. Show there is a unique entire function $f:\mathbb{C}\rightarrow\mathbb{C}$ such that the coefficients of the Taylor expansion about the origin $f(z)=\sum_{n=0}^{\infty}c_{n}z^{n}$ are nonnegative and $f$ satisfies $f(k)=\cosh(\sqrt{k})$…
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Number of solutions to $z=\frac{1}{4}e^z$ inside the unit circle

I'm trying to solve this using Rouche's theorem and I think I did. I'm completely winging this based on Wiki's article about it so please tell me if I'm off the ball. So the problem is actually finding the number of zeroes of $z-\frac{1}{4}e^z$…
Luka Horvat
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$f$ has a zero of order $m\iff \frac{1}{f}$ has a pole of order m

Question Let $f$ be holomorphic in a domain $D\subset \Bbb{C}$. Then $f$ has a zero of order $m$ in $z_0\in D \iff \frac{1}{f}\in H({D \setminus f^{-1}(0)}) \text{ has a pole of order $m$ in } z_0$. My attempt: I have proved the "$\implies$"…
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A more general case of the Laurent series expansion?

I was recently reading about Laurent series for complex functions. I'm curious about a seemingly similar situation that came up in my reading. Suppose $\Omega$ is a doubly connected region such that $\Omega^c$ (its complement) has two components…
Dedede
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Show that $f(z)$ is constant

If $f(z)=u(x,y) + iv(x,y)$ is an entire function such that $u\cdot v$ is constant then $f(z)$ is constant. I know that I need to use the Cauchy-Riemann equations, but I don't know how to start. Should I differentiate $u\cdot v$ with respect to…
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Determine $\int \limits_0^{\infty} \frac1{x^4+1}dx$

Let $$f(z)=\frac1{1+z^4}$$ (a) Find the sinularity of $f(z)$ in the first quadrant where $Re(z), Im(z) \ge 0$. (b) Find the residue of the singular point found in the first quadrant. (c) Let $\Gamma_R$ be the quarter circle $\Gamma_R: |z|=R$,…
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Prove that the range of the entire function $z^2+\cos(z)$ is all of $\mathbb{C}$.

Prove that the range of the entire function $z^2+\cos(z)$ is all of $\mathbb{C}$. I'm aware this question has been asked already, but the explanations were a little shakey and referenced a google sample preview of a text of whose terminology I…
Blake
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