模型与测量:测量的理论与实践

V. Babak, A. A. Zaporozhets, Y. Kuts, L. Scherbak
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引用次数: 0

摘要

众所周知,被测量量、过程和领域的确定性和概率模型,以及物理和概率度量,使形成测量结果成为可能,并使其具有客观性和可靠性。在此基础上,开发和改进了获取新知识和保持生产技术发展进程所必需的测量仪器。因此,改进和发展测量方法中的模型和措施问题对实现高测量精度和扩大其应用领域起着越来越重要的作用。本文介绍了模型和测量在测量中的应用研究的特点和结果。结果表明,物理的正确性和建立测量实验、执行测量实验的任务和条件、确定适当的模型和措施的必要性对获得的测量结果有重要影响。介绍了用信号场模型和方法评价物理量(包括热物理量)测量结果的现代方法的特点,这些物理量是用随机的量和角度表示的。在一般情况下,测度是一个可数加性集合函数,它以任何方式只获得负值,包括无穷。电荷作为一种数学模型的使用,极大地扩展了测量理论方法在计量学中的实际应用范围。考虑了直线、圆和电荷上的概率测量以及物理测量的例子。物理测量和概率测量的协调概念已经得到证实,目的是采用统一的方法来评估测量结果。联合使用物理和概率测度来形成测量结果,可以在一定程度上克服测量同态的问题。给出了在信息测量系统的硬件和软件模块中使用一组物理和概率测度的实例。概率归一化测度是一种非物理程度,而是各种随机因素在进行测量时对数据的值和特征以及测量结果的总体作用的测度。在测量数据的统计处理中使用概率度量,使得与测量数据的精度相比,可以提高测量结果的精度。测量过程中的信息保护程度是复杂的。度量是由许多因素构成的,其中大多数因素的作用具有随机性。这使得确定这样的测量成为可能,它既可以应用于单个操作,例如,通过通信通道传输测量数据,测量结果的注册,也可以应用于整个测量过程。测量理论中的随机方法在具有明显概率性质的物理量的测量中特别重要,例如,在纳米测量的情况下,量子效应的研究,等等。目前,在量子层面使用SI国际单位制和不确定度的概念来评价测量结果是测量实践的基础,需要对各个学科领域的测量过程进行广泛的理论和模拟研究,形成统一的测量方法。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
MODELS AND MEASURESIN THEORY AND PRACTICE OF MEASUREMENTS
It is known that deterministic and probabilistic models of measured quantities, processes and fields, as well as physical and probabilistic measures, make it possible to form a measurement result, to provide it with the properties of objectivity and reliability. On their basis, the measuring instruments necessary for obtaining new knowledge and maintaining the process of technological development of production are being developed and improved. Therefore, the issues of improving and developing models and measures in measurement methodology play an increasingly important role in achieving high measurement accuracy and expanding the areas of their application. The article is devoted to the features and results of the study of the application of models and measures in measurements. It is shown that the physical correctness and the need for setting up measuring experiments, performing tasks and conditions for their implementation, substantiating adequate models and measures significantly affect the obtained measurement result. The features of the modern methodology of using models of signals and fields and measures for evaluating the results of measuring physical quantities, including thermophysical ones, which are represented by random quantities and angles are presented. In the general case, a measure is a countably additive set function that acquires only negative values ​​in any way, including infinity. The use of charge as a mathematical model significantly expands the boundaries of the practical application of the methods of measure theory in metrology. Examples of probabilistic measures on a straight line, on a circle and a charge, as well as physical measures are considered. The concept of coordination of physical and probabilistic measures has been substantiated with the aim of a unified approach to assessing the measurement result. The joint use of physical and probabilistic measures for the formation of a measurement result allows to a certain extent overcome the problem of measurement homomorphism. An example of using a set of physical and probabilistic measures in the hardware and software modules of information and measuring systems is given. The probabilistic normalized measure is a non-physical degree, but a measure of the totality of the action of various random factors on the value and characteristics of data and the result of measurements when they are carried out. The use of a probabilistic measure in the statistical processing of measurement data makes it possible to increase the accuracy of the measurement result compared to the accuracy of the measurement data. The degree of information protection during measurements is complex. The measure is formed by many factors, the action of most of which is of a random nature. This makes it possible to determine such a measure as probabilistic, which can be applied both for individual operations, for example, transmission of measurement data via communication channels, registration of the measurement result, and for the entire measurement process as a whole. The stochastic approach in the theory of measurements is of particular importance in the case of measurements of physical quantities that have a pronounced probabilistic nature, for example, in the case of nano-measurements, the study of quantum effects, and the like. Currently, the use of the SI international system of units at the quantum level and the concept of uncertainty for evaluating measurement results, which are the foundation of measurement practice, requires a wide range of theoretical and simulation studies of measurement processes in various subject areas to form a unified measurement methodology.
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