$(p,q)$th order oriented growth measurement of composite $p$-adic entire functions
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Publication:4633468
DOI10.15330/cmp.10.2.248-272zbMath1411.30031OpenAlexW2908261155MaRDI QIDQ4633468
Publication date: 3 May 2019
Published in: Carpathian Mathematical Publications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.15330/cmp.10.2.248-272
Functional analysis over fields other than (mathbb{R}) or (mathbb{C}) or the quaternions; non-Archimedean functional analysis (46S10) Value distribution of meromorphic functions of one complex variable, Nevanlinna theory (30D35) Non-Archimedean function theory (30G06) Non-Archimedean valued fields (12J25)
Related Items (4)
On the growth properties of relative \((p, q)\)-th order and relative \((p, q)\)-th type of composite \(p\)-adic entire functions of several complex variables ⋮ Relative $(p,q)-\varphi$ order based some growth analysis of composite $p$-adic entire functions ⋮ Unnamed Item ⋮ Unnamed Item
Cites Work
- Zeros of the derivative of a \(p\)-adic meromorphic function
- Theorie de Nevanlinna p-adique. (p-adic Nevanlinna theory)
- Hayman's conjecture in a \(p\)-adic field
- Order, type and cotype of growth for \(p\)-adic entire functions: a survey with additional properties
- Value Distribution in p-adic Analysis
- Some old and new results on zeros of the derivative of a 𝑝-adic meromorphic function
- Exceptional values ofp-adic analytic functions and derivatives
- Thep-adic Hayman conjecture whenn= 2
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