Hardy–Smirnov空间上的加权复合算子

IF 0.3 Q4 MATHEMATICS
Valentin Matache
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引用次数: 0

摘要

f型抽象算子→ ψf◦ φ作用于函数空间称为加权复合算子。如果权重函数ψ是常数函数1,那么它们被称为复合算子。我们考虑了作用于Hardy–Smirnov空间上的加权复合算子,并证明了它们的酉不变性质可归结为对圆盘上经典Hardy空间上加权复合算子的研究。我们给出了这类结果的例子,例如证明了Forelli定理,即单位圆盘上非Hilbert-Hardy空间的等距需要是特殊加权合成算子,该定理推广到所有非Hilbert Hardy–Smirnov空间。对加权复合算子的有界性进行了深入的研究。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Weighted composition operators on Hardy–Smirnov spaces
Abstract Operators of type f → ψf ◦ φ acting on function spaces are called weighted composition operators. If the weight function ψ is the constant function 1, then they are called composition operators. We consider weighted composition operators acting on Hardy–Smirnov spaces and prove that their unitarily invariant properties are reducible to the study of weighted composition operators on the classical Hardy space over a disc. We give examples of such results, for instance proving that Forelli’s theorem saying that the isometries of non–Hilbert Hardy spaces over the unit disc need to be special weighted composition operators extends to all non–Hilbert Hardy–Smirnov spaces. A thorough study of boundedness of weighted composition operators is performed.
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来源期刊
Concrete Operators
Concrete Operators MATHEMATICS-
CiteScore
1.00
自引率
16.70%
发文量
10
审稿时长
22 weeks
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