A. Jiménez-Vargas, M. I. Ramírez, Moisés Villegas-Vallecillos
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引用次数: 0
摘要
给定复巴纳赫空间 E 的开放子集 U、U 上的权重 v 和复巴纳赫空间 F,让 \(H^\infty _v(U,F)\)表示从 U 到 F 的所有加权全形映射的巴纳赫空间,并赋予其加权至上规范。我们引入并研究了 \(H^\infty _v(U,F)\) 的毕夏普-费尔普斯-波洛巴斯性质(简称为 \(WH^\infty \)-BPB 性质)。林登斯特劳斯类型的一个结果说明了对于每个空间F来说,\(H^\infty _v(U,F)\) 具有\(WH^\infty\)-BPB性质的充分条件。这是 \(H^\infty _{v_p}(\mathbb {D},F)\) 具有 \(p\ge 1\) 的情况,其中 \(v_p\) 是 \(\mathbb {D}\) 上的标准多项式权重。研究复值和向量值情况下的(WH^\infty \)-BPB 性质的关系,以及对映射 \(f\in H^\infty _v(U,F)\)的引用性质的扩展,使得 vf 在 F 中有一个相对紧凑的范围。
The Bishop–Phelps–Bollobás Property for Weighted Holomorphic Mappings
Given an open subset U of a complex Banach space E, a weight v on U and a complex Banach space F, let \(H^\infty _v(U,F)\) denote the Banach space of all weighted holomorphic mappings from U into F, endowed with the weighted supremum norm. We introduce and study a version of the Bishop–Phelps–Bollobás property for \(H^\infty _v(U,F)\) (\(WH^\infty \)-BPB property, for short). A result of Lindenstrauss type with sufficient conditions for \(H^\infty _v(U,F)\) to have the \(WH^\infty \)-BPB property for every space F is stated. This is the case of \(H^\infty _{v_p}(\mathbb {D},F)\) with \(p\ge 1\), where \(v_p\) is the standard polynomial weight on \(\mathbb {D}\). The study of the relations of the \(WH^\infty \)-BPB property for the complex and vector-valued cases is also addressed as well as the extension of the cited property for mappings \(f\in H^\infty _v(U,F)\) such that vf has a relatively compact range in F.
期刊介绍:
Results in Mathematics (RM) publishes mainly research papers in all fields of pure and applied mathematics. In addition, it publishes summaries of any mathematical field and surveys of any mathematical subject provided they are designed to advance some recent mathematical development.