# Tagged Questions

Complex analysis, holomorphic functions, automorphic group actions and forms, pseudoconvexity, complex geometry, analytic spaces, analytic sheaves.

**-2**

**0**answers

### Property of a polynomial whose zeros lie in the half plane $\Re{(z)}\geq 1$

**0**

**0**answers

### Does Hartogs's Theorem for complex-analytic functions hold for real-analytic functions? [duplicate]

**3**

**1**answer

### Chow theorem in $\mathbb{C}^2$

**-3**

**0**answers

### On Fourier transforms of even functions [on hold]

**1**

**0**answers

### A circle separating the critical points

**4**

**0**answers

### Sobolev space under Mellin transform

**0**

**0**answers

### A property of a polynomial of degree 2

**3**

**0**answers

### An inequality with rotation

**2**

**0**answers

### Universal cover of ladderly puntured complex plane

**1**

**1**answer

### Zeros of Multivariate Complex Functions [need reference]

**0**

**0**answers

### Finding positive powers of a Laurent series

**0**

**0**answers

### Holomorphic function has radial limit at z=0 [duplicate]

**2**

**0**answers

### Is singular Cauchy operator bounded in Morrey spaces?

**2**

**0**answers

### On a real part of a series with complex numbers

**2**

**4**answers

### Complex differential equations

**1**

**0**answers

### Derivative of complex matrix pseudo inverse with respect to real and imaginary components

**1**

**0**answers

### Non-compact analogue of Hartog's extension theorem?

**1**

**0**answers

### Induction principle on proving an inequality

**1**

**1**answer

### The generalization of Hartogs' Theorem

**3**

**1**answer

### compare N(f,a,r) with T(f,r)

**5**

**2**answers

### Vector valued disc “algebra”

**2**

**0**answers

### A generalized Cauchy type functional equation

**0**

**1**answer

### An inequality that involves integrals

**2**

**1**answer

### fast algorithms for external angle computations

**2**

**1**answer

### Roots of unity and an extremal problem [closed]

**13**

**4**answers

### Teaching Prime Number Theorem in a Complex Analysis Class for Physicists

**3**

**0**answers

### Reference request: basics about modular curves

**2**

**2**answers

### Does Bergman metric induce the standard topology?

**-3**

**1**answer

### An interesting phenomenon of the analytic continuation of Riemann zeta function [closed]

**1**

**1**answer

### Conditions to obtain a real logarithm of a unitary unimodular complex matrix?

**3**

**1**answer

### On the values of an entire function

**4**

**0**answers

### Bezout theorem for germs of holomorphic functions

**0**

**0**answers

### An open inequality

**5**

**1**answer

### Holomorphic functions with equal inverse images of unit circle

**0**

**1**answer

### Exponential Sequence of Sheaves

**1**

**1**answer

### Gluing locally defined continous functions over complex domain

**1**

**1**answer

### positive real matrix-valued function as linear combination of positive-real functions

**1**

**1**answer

### zeros of sums of complex exponential functions

**3**

**0**answers

### best-possible inequalities for hypergeometric functions

**1**

**0**answers

### The comparison of certain modules arising from the Cauchy-Riemann differential operator

**0**

**4**answers

### On the real part of the Riemann zeta function inside the critical strip

**4**

**2**answers

### Is Riemann zeta function injective in some strips $a<\Re(s)<b$, where $0\leq a<b \leq 1$?

**1**

**1**answer

### Generating series of rational$\times \exp($rational$)$

**12**

**2**answers

### Algebraic vs analytic normality

**4**

**0**answers

### Continuous function on a complex space that is holomorphic on the complement of a closed subspace

**1**

**0**answers

### Bound for truncation error of continued fraction for $E_1(z)$

**10**

**0**answers

### Witt's proof of Gelfand-Mazur / Ostrowski's Theorem

**3**

**1**answer

### About some positive elements in a group von Neumann algebra

**4**

**1**answer

### $L^1$ norm of Littlewood polynomials on the unit circle

**6**

**1**answer