Let HE<sub>I</sub>, HE<sub>II</sub>, HE<sub>III</sub> and HE<sub>IV</sub> be the first, second, third and fourth type Loo-Keng Hua domain respectively, 𝜑 a holomorphic self-map of HE<sub>I&...
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https://www.riss.kr/link?id=A106881671
2020
English
SCIE,SCOPUS,KCI등재
학술저널
583-595(13쪽)
0
상세조회0
다운로드다국어 초록 (Multilingual Abstract)
Let HE<sub>I</sub>, HE<sub>II</sub>, HE<sub>III</sub> and HE<sub>IV</sub> be the first, second, third and fourth type Loo-Keng Hua domain respectively, 𝜑 a holomorphic self-map of HE<sub>I&...
Let HE<sub>I</sub>, HE<sub>II</sub>, HE<sub>III</sub> and HE<sub>IV</sub> be the first, second, third and fourth type Loo-Keng Hua domain respectively, 𝜑 a holomorphic self-map of HE<sub>I</sub>, HE<sub>II</sub>, HE<sub>III</sub>, or HE<sub>IV</sub> and u ∈ H(𝓜) the space of all holomorphic functions on 𝓜 ∈ {HE<sub>I</sub>, HE<sub>II</sub>, HE<sub>III</sub>, HE<sub>IV</sub>}. In this paper, motivated by the well known Hua's matrix inequality, first some inequalities for the points in the Bers-type spaces of the Loo-Keng Hua domains are obtained, and then the boundedness and compactness of the weighted composition operators W<sub>𝜑,u</sub> : f ↦ u · f ◦ 𝜑 on Bers-type spaces of these domains are characterized.
ISOLATION NUMBERS OF INTEGER MATRICES AND THEIR PRESERVERS
THE LOCAL TIME OF THE LINEAR SELF-ATTRACTING DIFFUSION DRIVEN BY WEIGHTED FRACTIONAL BROWNIAN MOTION
POSITIVELY WEAK MEASURE EXPANSIVE DIFFERENTIABLE MAPS
GLOBAL UNIQUENESS FOR THE RADON TRANSFORM