Noncommutative Number Systems for Quantum Information

arXiv - PHYS - General Physics Pub Date : 2024-05-14 DOI:arxiv-2405.10339

Otto C. W. KongNat'l Central U, Taiwan

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Abstract

Dirac talked about q-numbers versus c-numbers. Quantum observables are q-number variables that generally do not commute among themselves. He was proposing to have a generalized form of numbers as elements of a noncommutative algebra. That was Dirac's appreciation of the mathematical properties of the physical quantities as presented in Heisenberg's new quantum theory. After all, the familiar real, or complex, number system only came into existence through the history of mathematics. Values of physical quantities having a commutative product is an assumption that is not compatible with quantum physics. The revolutionary idea of Heisenberg and Dirac was pulled back to a much more conservative setting by the work of Schr\"odinger, followed by Born and Bohr. What Bohr missed is that the real number values we obtained from our measurements are only a consequence of the design of the kind of experiments and our using real numbers to calibrate the output scales of our apparatus. It is only our modeling of the information obtained about the physical quantities rather than what Nature dictates. We have proposed an explicit notion of definite noncommutative values of observables that gives a picture of quantum mechanics as realistic as the classical theory. In this article, we illustrate how matrices can be taken as noncommutative (q-)numbers serving as the values of physical quantities, each to be seen as a piece of quantum information. Our main task is to clarify the subtle issues involved in setting up a conventional scheme assigning matrices as values to the physical quantities.

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量子信息的非交换数系统

狄拉克谈到了 q 数和 c 数。量子观测值是 q 数变量，它们之间通常不换算。他提议用一种广义的数字形式作为非交换代数的元素。这就是狄拉克对海森堡新量子理论中提出的物理量的数学特性的理解。毕竟，我们熟悉的实数或复数系统是在数学史上才出现的。物理量的值具有交换积，这是一个与量子物理学不相容的假设。玻尔所忽略的是，我们从测量中获得的实数值只是实验设计和我们使用实数来校准仪器输出刻度的结果。这只是我们对所获得的物理量信息进行建模的结果，而不是大自然所决定的。我们提出了一个观测值的无限非交换值的明确概念，它给出了一幅与经典理论一样逼真的量子力学图景。在这篇文章中，我们将说明如何把矩阵看作是作为物理量值的非交换（q-）数，每个矩阵都可以看作是一个量子信息。我们的主要任务是澄清在建立一个将矩阵赋值给物理量的常规方案时所涉及的微妙问题。

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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arXiv - PHYS - General Physics

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