Considerable Sets of Linear Operators in Hilbert Spaces as Operator Generalized Effect Algebras

Paseka J.; Rie?anová Z.

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Considerable Sets of Linear Operators in Hilbert Spaces as Operator Generalized Effect Algebras

机译：Hilbert空间中作为算子广义效应代数的大量线性算子集

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We show that considerable sets of positive linear operators namely their extensions as closures, adjoints or Friedrichs positive self-adjoint extensions form operator (generalized) effect algebras. Moreover, in these cases the partial effect algebraic operation of two operators coincides with usual sum of operators in complex Hilbert spaces whenever it is defined. These sets include also unbounded operators which play important role of observables (e. g., momentum and position) in the mathematical formulation of quantum mechanics.

机译：我们证明了相当数量的正线性算子集，即它们的闭包，伴随子或Friedrichs正自伴随引子的扩展形成了算子（广义）效应代数。而且，在这些情况下，无论何时定义，两个算子的局部效应代数运算都与复杂希尔伯特空间中算子的通常和一致。这些集合还包括在量子力学的数学公式中起可观察性（例如动量和位置）的重要作用的无界算子。

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《Foundations of Physics: An International Journal Devoted to the Conceptual Bases and Fundamental Theories of Modern Physics, Biophysics & Cosmology》 |2011年第10期|共14页
作者
Paseka J.; Rie?anová Z.;
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正文语种 eng
中图分类物理学;
关键词
(Generalized) effect algebra; (Unbounded) positive linear operator; Adjoint; Closure; Friedrichs extension; Hilbert space; Quantum structures;

机译：（广义）效应代数;（无界）正线性算子;伴随;闭列;Friedrichs扩展;希尔伯特空间;量子结构;

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1. Considerable Sets of Linear Operators in Hilbert Spaces as Operator Generalized Effect Algebras [J] . Jan Paseka, Zdenka Riečanová Foundations of Physics . 2011,第10期

机译：Hilbert空间中作为算子广义效应代数的大量线性算子集
2. Considerable Sets of Linear Operators in Hilbert Spaces as Operator Generalized Effect Algebras [J] . Paseka J., Rie?anová Z. Foundations of Physics: An International Journal Devoted to the Conceptual Bases and Fundamental Theories of Modern Physics, Biophysics & Cosmology . 2011,第10期

机译：Hilbert空间中作为算子广义效应代数的大量线性算子集
3. Generalized Effect Algebras of Positive Self-adjoint Linear Operators on Hilbert Spaces [J] . Qiang Lei, Junde Wu International Journal of Theoretical Physics: A Journal of Original Research and Reviews in Theoretical Physics and Related Mathematics, Dedicated to the Unification of Physics . 2014,第11期

机译：Hilbert空间上积极自伴线性运营商的广义效应代数
4. A Linearly Convergent Algorithm for Multi-Agent Quasi-Nonexpansive Operators in Real Hilbert Spaces [C] . Xiuxian Li, Min Meng, Lihua Xie IEEE Conference on Decision and Control . 2020

机译：Real Hilbert空间中的多代理准非非划分运算符的线性收敛算法
5. DERIVATIONS ON B(H) (THE ALGEBRA OF ALL BOUNDED LINEAR OPERATORS ON A HILBERT SPACE). [D] . HO, YANG. 1974

机译：B（H）（希尔伯特空间上所有有界线性算子的代数）的导数。
6. New generalized systems of nonlinear ordered variational inclusions involving ⊕ operator in real ordered Hilbert spaces [O] . Mohd. Sarfaraz, Kottakkaran Sooppy Nisar, Ahmed Morsy, -1

机译：实有序Hilbert空间中涉及⊕算子的非线性有序变分包含的新广义系统
7. Perturbations and expressions for generalized inverses in Banach spaces and Moore–Penrose inverses in Hilbert spaces of closed linear operators [O] . Huang Qianglian, Zhai Wenxiao 2011

机译：封闭线性算子在Banach空间中广义逆的扰动和表达式以及在Hilbert空间中Moore-Penrose逆
8. An Exposition of Hilbert Space and Linear Operators for Engineers and Scientists [R] . Reza, F. M. 1968

机译：工程师和科学家的希尔伯特空间和线性算子的博览会

Considerable Sets of Linear Operators in Hilbert Spaces as Operator Generalized Effect Algebras

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