About SIC POVMs and discrete Wigner distributions

Journal of optics. B, Quantum and semiclassical optics : journal of the European Optical Society Pub Date : 2005-12-01 DOI:10.1088/1464-4266/7/12/051

S. Colin, J. Corbett, T. Durt, D. Gross

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引用次数: 36

Abstract

A set of d2 vectors in a Hilbert space of dimension d is called equiangular if each pair of vectors encloses the same angle. The projection operators onto these vectors define a POVM which is distinguished by its high degree of symmetry. Measures of this kind are called symmetric informationally complete, or SIC POVMs for short, and could be applied for quantum state tomography. Despite its simple geometrical description, the problem of constructing SIC POVMs or even proving their existence seems to be very hard. It is our purpose to introduce two applications of discrete Wigner functions to the analysis of the problem at hand. First, we will present a method for identifying symmetries of SIC POVMs under Clifford operations. This constitutes an alternative approach to a structure described before by Zauner and Appleby. Further, a simple and geometrically motivated construction for an SIC POVM in dimensions two and three is given (which, unfortunately, allows no generalization). Even though no new structures are found, we hope that the re-formulation of the problem may prove useful for future inquiries.

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关于SIC povm和离散Wigner分布

在d维的希尔伯特空间中，如果每一对向量都包含相同的角，则d2向量的集合称为等角向量。这些向量上的投影算子定义了一个POVM，其特点是高度对称。这种测量被称为对称信息完备，简称SIC povm，可以应用于量子态层析成像。尽管它的几何描述很简单，但构造SIC povm甚至证明其存在的问题似乎非常困难。我们的目的是介绍离散维格纳函数在分析手头问题中的两种应用。首先，我们将提出一种在Clifford操作下识别SIC povm对称性的方法。这构成了Zauner和Appleby之前描述的结构的另一种方法。此外，给出了二维和三维SIC POVM的一个简单的几何驱动结构(不幸的是，它不允许泛化)。尽管没有找到新的结构，我们希望重新提出这个问题可能对今后的调查有用。

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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Journal of optics. B, Quantum and semiclassical optics : journal of the European Optical Society

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