Integral formulas of Carleman and Levin for meromorphic and subharmonic functions
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Publication:2678464
DOI10.3103/S1066369X22060056OpenAlexW4315558470MaRDI QIDQ2678464
Publication date: 23 January 2023
Published in: Russian Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3103/s1066369x22060056
Harmonic, subharmonic, superharmonic functions in two dimensions (31A05) Zeros of polynomials, rational functions, and other analytic functions of one complex variable (e.g., zeros of functions with bounded Dirichlet integral) (30C15) Meromorphic functions of one complex variable (general theory) (30D30)
Cites Work
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- Slowness of the growth on the imaginary axis of entire functions of exponential type with given zeros
- On the distribution of zero sets of holomorphic functions
- Completeness of systems of entire functions in spaces of holomorphic functions
- Entire and meromorphic functions. With assistance from James E. Colliander
- Zeros of holomorphic functions in the unit disk and \(\rho \)-trigonometrically convex functions
- Zeros of holomorphic functions in the unit ball and subspherical functions
- An analog of Poisson-Jensen formula for annuli.
- Fourier series and $ \delta$-subharmonic functions of finite $ \gamma$-type in a half-plane
- Growth of Subharmonic Functions
- THE FOURIER SERIES METHOD FOR ENTIRE AND MEROMORPHIC FUNCTIONS OF COMPLETELY REGULAR GROWTH
- A UNIQUENESS THEOREM FOR SUBHARMONIC FUNCTIONS OF FINITE ORDER
- A Fourier series method for meromorphic and entire functions
- Functions Representable as Differences of Subharmonic Functions
- Functions of Potential Type
