Variants of application of the least squares method in Szyszkowski and Rosin–Rammler approximations

Bulletin of the Tomsk Polytechnic University Geo Assets Engineering Pub Date : 2024-01-31 DOI:10.18799/24131830/2024/1/4414

Vladislav M. Galkin, Yuriy S. Volkov, Liliya V. Chekantseva, Vladimir A. Ivanov

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Abstract

Relevance. Caused by the need to develop and optimize the mathematical apparatus for processing the results of laboratory experiments and increasing the adequacy of the results obtained. Aim. To create alternative methods for finding the parameters of the Szyszkowski and Rosin–Rammler dependencies, which are subject to surfactant adsorption from an aqueous solution on solid adsorbents and deposition of suspended particles in sedimentation analysis. Methods. The main method for determining the parameters of two-parameter dependencies is the least squares method. The standard approach is based on finding the minimum of a function of two variables by computational methods of nonlinear programming. The equations, obtained by equating the derivatives of the objective function for each of the parameters to zero, are used as necessary conditions for the minimum of the objective function. The paper considers alternative approaches to obtaining explicit formulas and reduction to the solution of the transcendental equation. Results. For the two-parameter dependencies of Szyszkowski and Rosin–Rammler, the alternative approaches for determining unknown parameters are proposed. In the standard approach, solving the problem is based on numerical minimization of a function of two variables by nonlinear programming methods. The authors propose the approach, in which the Szyszkowski and Rosin–Rammler equations are subjected to some equivalent transformations so that the use of the necessary minimum conditions makes it possible to obtain a linear equation with respect to at least one of the required parameters. This leads to simplification of calculations, it is required to solve one transcendental equation numerically, the second parameter is then determined by an explicit formula. And for the Rosin–Rammler dependence, in one of the proposed variants, it was possible to obtain explicit formulas for finding both parameters.

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在 Szyszkowski 和 Rosin-Rammler 近似中应用最小二乘法的变体

相关性。由于需要开发和优化处理实验室实验结果的数学仪器，提高所获结果的适当性。目的。针对固体吸附剂对水溶液中表面活性剂的吸附以及沉降分析中悬浮颗粒的沉降，建立 Szyszkowski 和 Rosin-Rammler 依赖关系参数的替代方法。方法。确定双参数依赖关系参数的主要方法是最小二乘法。标准方法的基础是通过非线性编程计算方法找到两个变量函数的最小值。通过将目标函数对每个参数的导数等价为零得到的方程，被用作目标函数最小值的必要条件。本文考虑了获得显式公式和还原到超越方程求解的其他方法。结果。针对 Szyszkowski 和 Rosin-Rammler 的双参数依赖关系，提出了确定未知参数的替代方法。在标准方法中，解决问题的基础是通过非线性编程方法对两个变量的函数进行数值最小化。作者提出的方法是，对 Szyszkowski 和 Rosin-Rammler 方程进行一些等价变换，从而利用必要的最小条件，获得至少一个所需参数的线性方程。这就简化了计算，只需对一个超越方程进行数值求解，然后通过一个明确的公式确定第二个参数。而对于罗辛-拉姆勒依赖关系，在其中一个提议的变体中，可以获得用于求解两个参数的明确公式。

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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Bulletin of the Tomsk Polytechnic University Geo Assets Engineering

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