A new uncertain linear regression model based on slope mean

The least squares estimate can fully consider the given data and minimize the sum of squares of the residuals, and it can solve the linear regression equation of the imprecisely observed data effectively. Based on the least squares estimate and uncertainty theory, we first proposed the slope mean model, which is to calculate the slopes of expected value and each given data, and the average value of these slopes as the slope of the linear regression equation, substituted into the expected value coordinates, and we can get the linear regression equation. Then, we proposed the deviation slope mean model, which is a very good model and the focus of this paper. The idea of the deviation slope mean model is to calculate the slopes of each given data deviating from the regression equation, and take the average value of these slopes as the slope of the regression equation. Substituted into the expected value coordinate, we can get the linear regression equation. The deviation slope mean model can also be extended to multiple linear regression equation, we transform the established equations into matrix equation and use inverse matrix to solve unknown parameters. Finally, we put forward the hybrid model, which is a simplified model based on the combination of the least squares estimation and deviation slope mean model. To illustrate the efficiency of the proposed models, we provide numerical examples and solve the linear regression equations of the imprecisely observed data and the precisely observed data respectively. Through analysis and comparison, the deviation slope mean model has the best fitting effect. Part of the discussion, we are explained and summarized.

[1]  Xiao Wang,et al.  An uncertain currency model with floating interest rates , 2017, Soft Comput..

[2]  Xiaosheng Wang,et al.  A new uncertain regression model and its application , 2020, Soft Comput..

[3]  Limei Yan,et al.  Uncertain aggregate production planning , 2012, Soft Computing.

[4]  Xiaosheng Wang,et al.  Method of moments for estimating uncertainty distributions , 2014 .

[5]  Yuanlong Song,et al.  Uncertain multivariable regression model , 2018, Soft Computing.

[6]  Baoding Liu,et al.  Uncertainty Theory - A Branch of Mathematics for Modeling Human Uncertainty , 2011, Studies in Computational Intelligence.

[7]  Xiaosheng Wang,et al.  Uncertain linear regression model and its application , 2017, J. Intell. Manuf..

[8]  Baoding Liu Some Research Problems in Uncertainty Theory , 2009 .

[9]  Baoding Liu,et al.  Residual and confidence interval for uncertain regression model with imprecise observations , 2018, J. Intell. Fuzzy Syst..

[10]  Yuhan Liu,et al.  Expected Value of Function of Uncertain Variables , 2010 .

[11]  Natalia Kryvinska,et al.  Multiple Linear Regression Based on Coefficients Identification Using Non-iterative SGTM Neural-like Structure , 2019, IWANN.

[12]  Baoding Liu Why is There a Need for Uncertainty Theory , 2012 .

[13]  Ying Yang,et al.  Least absolute deviations estimation for uncertain regression with imprecise observations , 2019, Fuzzy Optim. Decis. Mak..

[14]  Liang Fang,et al.  Uncertain Johnson–Schumacher growth model with imprecise observations and k-fold cross-validation test , 2020, Soft Comput..

[15]  Baoding Liu,et al.  Uncertain regression analysis: an approach for imprecise observations , 2018, Soft Comput..

[16]  Ivan Izonin,et al.  Development of the Non-Iterative Supervised Learning Predictor Based on the Ito Decomposition and SGTM Neural-Like Structure for Managing Medical Insurance Costs , 2018, Data.

[17]  Limei Yan,et al.  Mean-TVaR Model for Portfolio Selection with Uncertain Returns , 2012 .