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.

51771 questions
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geometric meaning of differentiation with respect to the complex conjugate of $z$

The derivative of a function $f: C \rightarrow C$ with respect to $\overline{z}$ is defined as $$ \frac{1}{2} \left( \frac{\partial}{\partial x} + i \frac{\partial}{\partial y} \right) $$ where $\frac{\partial}{\partial x}$ is defined as the…
angela o.
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Removable singularity when multiplied by linear factor

I was thinking about this situation: If $f(z)$ is holomorphic everywhere except at $a$ (where it has a pole), and has a removable singularity or a pole at $\infty$, does $(z-a)f(z)$ also have a removable singularity or a pole at $\infty$? In the…
Mika H.
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Is there a way to calculate $\int \limits_0^1\frac{x^3}{\sqrt{x^2-1}}\frac{1}{1-a^2x^2}\frac{1}{1-b^2x^2}\frac{1}{c-x}\mathrm dx$

I want to calculate $\displaystyle \int \limits_0^1\dfrac{x^3}{\sqrt{x^2-1}}\dfrac{1}{1-a^2x^2}\dfrac{1}{1-b^2x^2}\dfrac{1}{c-x}\mathrm dx$ $a$ and $b$ are real parameters, c could be complex and is the solution of a cubic equation. I tried to find…
tired
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Contour integration with 2 simple poles on contour

Ok for this one I would appreciate if someone could give me a conceptual answer first. I am supposed to integrate $\int_{-\infty}^{\infty} \frac{e^{-i q t}}{p^2 - q^2} dq$ along a half circle C (whose radius goes to infinity), which comprises a…
gorgy
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Multiplicative Analytic Functions?

Possible Duplicate: $f(z_1 z_2) = f(z_1) f(z_2)$ for $z_1,z_2\in \mathbb{C}$ then $f(z) = z^k$ for some $k$ How can we characterize the analytic functions defined in the open unit disc $D\subset\mathbb{C}$ that satisfy $f(ab)=f(a)f(b)\text{ }$ …
RHP
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shows that if $P(z)$ has no complex zero, then $\frac{1}{P(z)}$ is bounded

I hope someone could enlighten me! If $P(z)$ is a polynomial, shows that if $P(z)$ has no complex zero, then $\frac{1}{P(z)}$ is bounded.
Victor
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ii) Show that $u$ is not a real part of the function which analytic on $\mathbb{C} \backslash \lbrace 0 \rbrace$

Suppose $u(x,y)=\ln(x^2+y^2)$ i) Show that $u$ is harmonic on $\mathbb{C} \backslash \lbrace 0 \rbrace$ ii) Show that $u$ is not the real part of a function which analytic on $\mathbb{C} \backslash \lbrace 0 \rbrace$ I manage to show the first…
Idonknow
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About Non-tangential limits of an analytic function

There is a function which has non-tangential limits at no point of $ \partial \mathbb{D}$ . Where $\mathbb{D}$ is unit open disk in $\mathbb{C}$ ? Can anybody give me that example.
user95731
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If $\Re(f)=\Re(g)$ on the boundary of $D$ then the equality is also true on $D$

Let $f,g$ be holomorphic on a bounded domain $D$ and continuous on $\overline{D}$. Assume that $\Re(f)=\Re(g)\forall z\in\partial D$. Prove that $\Re (f-g)=0$. My attempt Consider $h=f-g$. Clearly $h$ is holomorphic on $D$, continuous on…
Alex Nguyen
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Looser Conditions on Casorati-Weierstrass

The Casorati-Weierstrass Theorem presented in Stein and Shakarchi's "Complex Analysis" discusses the behavior of the image of a homlomorphic function in a punctured disc about an essential singularity. I show that the function need not be…
r.g.
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How do I find the arctan of a complex number?

I am trying to simplify $$\tan^{-1}\left(e^{ix}\right), x\in\mathbb{R}$$ $$=\\tan^{-1}\left(\cos x+i\sin x\right)$$ Using…
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local constant $\Rightarrow$ global constant

Let $f\colon M\to\mathbb{C}$ be a holomorphic, localy constant function, $M\subseteq\mathbb{C}$ open and connected. Show, that then $f$ is constant on whole $M$. Isn't this an easy consequence of the identity theorem, i.e: $f$ is constant…
user34632
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Show that an analytic function $f$ has a zero on the unit disc given that $|f(z)|>2$ on the boundary and $f(0) = 1$

Question: Suppose $f$ is analytic in a region A containing the unit disc $D = \{ z: |z| \leq 1 \} $ and such that $|f(z)|>2$ whenever $|z| = 1$. If $f(0) = 1$, show that $f$ has a zero in D. Thoughts: I am studying for an exam in complex analysis…
Sid
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Find the number of zeroes of the polynomial $h(z)=z^{5} + 5z^{3} + 2z^{2} + 4z + 1$ in the right half-plane.

Question: Find the number of zeroes of the polynomial $h(z)=z^{5}+5z^{3}+2z^{2}+4z+1$ in the right half-plane. Comments: There may be a number of ways to arrive at a solution to this problem, but it would be instructive for me to know if anyone can…
Sid
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Does $|e^{f(z)}| = 1$ on parallel lines imply that $f$ is constant?

Let $f : \mathbb C \to \mathbb C$ be a holomorphic function. Suppose that for some $a