正算子值测度和密定义算子值框架

arXiv: Functional Analysis Pub Date : 2020-04-24 DOI:10.1216/RMJ.2021.51.265

B. Robinson, Bill Moran, D. Cochran

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引用次数: 0

摘要

在信号处理文献中，框架是在希尔伯特空间中执行分析和重建的机制。相比之下，在量子理论中，正算子值测度(POVM)分解希尔伯特空间向量以计算测量概率。框架及其最常见的概括可以看作是POVM的产生，但是每个合理的POVM都是从一种框架类型产生的吗?在本文中，我们用radon - nikodym型结果回答了这个问题。

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Positive operator-valued measures and densely defined operator-valued frames

In the signal-processing literature, a frame is a mechanism for performing analysis and reconstruction in a Hilbert space. By contrast, in quantum theory, a positive operator-valued measure (POVM) decomposes a Hilbert-space vector for the purpose of computing measurement probabilities. Frames and their most common generalizations can be seen to give rise to POVMs, but does every reasonable POVM arise from a type of frame? In this paper we answer this question using a Radon-Nikodym-type result.

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arXiv: Functional Analysis

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