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引用次数: 0
摘要
研究了形式为$$f_\omega(z)= \sum _{j=0}^{\infty}\chi_j(\omega) a_j z^j,$$的单位圆盘上随机解析函数的值分布,其中\(a_j\in\mathbb{C}\)和\(\chi_j(\omega)\)是定义在概率空间\((\Omega, \mathcal{F}, \mu)\)上的独立同分布随机变量。一些定理补充了[6]中的工作,[6]处理随机的整个函数。我们首先定义了上述形式的随机解析函数族,其中包括高斯解析函数、Rademacher解析函数和Steinhaus解析函数。然后证明了积分计数函数\(N(r, a, f_\omega)\)与\(f\)在圆\(|z|=r\)上的\(L_2\)范数之间的关系,因为\(r\)接近\(1\)。作为副产品,我们得到了关于单位圆盘的内万林纳第二主要定理。最后,给出了单位圆盘上\(f\)和\(f_\omega\)的最大模的定理。
where \(a_j\in\mathbb{C}\) and \(\chi_j(\omega)\) are independent and identically distributed random variables defined on a probability space \((\Omega, \mathcal{F}, \mu)\). Some of the theorems complement the work in
[6],
which deals with random entire functions.
We first define a family of random analytic functions in the above form, which includes Gaussian, Rademacher, and Steinhaus analytic functions. Then we prove the relationship between the integrated counting function \(N(r, a, f_\omega)\)
and the \(L_2\) norm of \(f\) on the circle \(|z|=r\) as \(r\) is close to \(1\). As a by-product, we obtain Nevanlinna's second main theorem on the unit disk. Finally, we show theorems on the maximum modulus of \(f\) and \(f_\omega\) on the unit disk.
期刊介绍:
Traditionally the emphasis of Analysis Mathematica is classical analysis, including real functions (MSC 2010: 26xx), measure and integration (28xx), functions of a complex variable (30xx), special functions (33xx), sequences, series, summability (40xx), approximations and expansions (41xx).
The scope also includes potential theory (31xx), several complex variables and analytic spaces (32xx), harmonic analysis on Euclidean spaces (42xx), abstract harmonic analysis (43xx).
The journal willingly considers papers in difference and functional equations (39xx), functional analysis (46xx), operator theory (47xx), analysis on topological groups and metric spaces, matrix analysis, discrete versions of topics in analysis, convex and geometric analysis and the interplay between geometry and analysis.
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