Hilbert \(C^{*}\)-modules in which all relatively strictly closed submodules are complemented

Pub Date : 2021-12-23 DOI:10.3336/gm.56.2.08
B. Guljaš
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Abstract

We give the characterization and description of all full Hilbert modules and associated algebras having the property that each relatively strictly closed submodule is orthogonally complemented. A strict topology is determined by an essential closed two-sided ideal in the associated algebra and a related ideal submodule. It is shown that these are some modules over hereditary algebras containing the essential ideal isomorphic to the algebra of (not necessarily all) compact operators on a Hilbert space. The characterization and description of that broader class of Hilbert modules and their associated algebras is given. As auxiliary results we give properties of strict and relatively strict submodule closures, the characterization of orthogonal closedness and orthogonal complementing property for single submodules, relation of relative strict topology and projections, properties of outer direct sums with respect to the ideals in \(\ell_\infty\) and isomorphisms of Hilbert modules, and we prove some properties of hereditary algebras and associated hereditary modules with respect to the multiplier algebras, multiplier Hilbert modules, corona algebras and corona modules.
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Hilbert \(C^{*}\) -所有相对严格封闭的子模块互补的模块
给出了所有具有相对严格闭子模正交补性质的满Hilbert模及其相关代数的刻划和描述。严格拓扑是由相关代数中的一个基本封闭的双边理想和一个相关的理想子模决定的。证明了这些是遗传代数上的一些模,这些模与Hilbert空间上的(不一定是全部)紧算子的代数是本质理想同构的。给出了更广泛的一类希尔伯特模及其相关代数的表征和描述。作为辅助结果,我们给出了严格和相对严格子模闭包的性质,单子模的正交闭合性和正交补性的刻画,相对严格拓扑与投影的关系,关于\(\ell_\infty\)中理想的外直接和的性质和Hilbert模的同构,并证明了遗传代数和相关遗传模关于乘子代数的一些性质。乘数Hilbert模,电晕代数和电晕模。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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