Estimating Unknown Parameters and Disturbance Term in Uncertain Regression Models by the Principle of Least Squares

Symmetry Pub Date : 2024-09-09 DOI:10.3390/sym16091182
Han Wang, Yang Liu, Haiyan Shi
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Abstract

In the field of statistics, uncertain regression analysis occupies an important position. It can thoroughly analyze data sets contained in complex uncertainties, aiming to quantify and reveal the intricate relationships between variables. It is worth noting that the traditional least squares method only takes into account the reduction in the deviations between predictions and observations, and fails to fully consider the inherent characteristics of the correlation uncertainty distributions under the uncertain regression framework. In light of this, this paper constructs a statistical invariant with symmetric uncertainty distribution based on the observations and the disturbance term. It also proposes the least squares estimation of unknown parameters and disturbance term in the uncertain regression model based on the least squares principle and, combined with the mathematical properties of the normal uncertainty distribution, gives a numerical algorithm for solving specific estimates. Finally, in order to verify the effectiveness of the least squares estimation method proposed in this paper, we also design two numerical examples and an empirical study of forecasting of electrical power output.
用最小二乘法原理估计不确定回归模型中的未知参数和干扰项
在统计学领域,不确定回归分析占有重要地位。它可以深入分析包含复杂不确定性的数据集,旨在量化和揭示变量之间错综复杂的关系。值得注意的是,传统的最小二乘法只考虑了预测值与观测值之间偏差的减小,未能充分考虑不确定回归框架下相关不确定性分布的固有特征。有鉴于此,本文基于观测值和干扰项,构建了具有对称不确定性分布的统计不变量。本文还根据最小二乘原理,提出了不确定回归模型中未知参数和干扰项的最小二乘估计方法,并结合正态不确定性分布的数学特性,给出了求解具体估计值的数值算法。最后,为了验证本文提出的最小二乘估计方法的有效性,我们还设计了两个数值实例,并对电力输出预测进行了实证研究。
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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