经典和现代回归分析及其应用(第2版影印版)(影印版)(海外优秀数学类教材系列丛书)(Classical and Modern Regression with Applications)
分類: 图书,教材教辅与参考书,大学,数理化,
品牌: 麦尔斯
基本信息·出版社:高等教育出版社
·页码:488 页
·出版日期:2005年
·ISBN:7040163233
·条形码:9787040163230
·包装版本:1版
·装帧:平装
·开本:16
·正文语种:英语
·读者对象:使用对象:教师,学生
·丛书名:海外优秀数学类教材系列丛书
·外文书名:Classical and Modern Regression with Applications
产品信息有问题吗?请帮我们更新产品信息。
内容简介《经典和现代回归分析及其应用》纯英文影印版,Many volumes have been written by statisticians and scientists with the resultbeing that the arsenal of effective regression methods has increased manyfold.My intent for this second edition is to provide a rather substantial increase inmaterial related to classical regression while continuing to introduce relevant newand modern techniques. I have included major supplements in simple linearregression that deal with simultaneous influence, maximum likelihood estimationof parameters, and the plotting of residuals. In multiple regression, new andsubstantial sections on the use of the general linear hypothesis, indicator variables,the geometry of least squares, and relationship to ANOVA models are added.
目录
CHAPTER 1
INTRODUCTION: REGRESSION ANALYSIS
Regression models
Formal uses of regression analysis
The data base
References
CHAPTER 2
THE SIMPLE LINEAR REGRESSION MODEL
The model description
Assumptions and interpretation of model parameters
Least squares formulation
Maximum likelihood estimation
Partioning total variability
Tests of hypothesis on slope and intercept
Simple regression through the origin (Fixed intercept)
Quality of fitted model
Confidence intervals on mean response and prediction intervals
Simultaneous inference in simple linear regression
A complete annotated computer printout
A look at residuals
Both x and y random
Exercises
References
CHAPTER 3
THE MULTIPLE LINEAR REGRESSION MODEL
Model description and assumptions
The general linear mode] and the least squares procedure
Properties of least squares estimators under ideal conditions
Hypothesis testing in multiple linear regression
Confidence intervals and prediction intervals in multiple regressions
Data with repeated observations
Simultaneous inference in multiple regression
Multicollinearity in multiple regression data
Quality fit, quality prediction, and the HAT matrix
Categorical or indicator variables (Regression models and ANOVA models)
Exercises
References
CHAPTER 4
CRITERIA FOR CHOICE OF BEST MODEL
Standard criteria for comparing models
Cross validation for model selection and determination of model performance
Conceptual predictive criteria (The Cp statistic)
Sequential variable selection procedures
Further comments and all possible regressions
Exercises
References
CHAPTER 5
ANALYSIS OF RESIDUALS 209
Information retrieved from residuals
Plotting of residuals
Studentized residuals
Relation to standardized PRESS residuals
Detection of outliers
Diagnostic plots
Normal residual plots
Further comments on analysis of residuals
Exercises
References
CHAPTER 6
INFLUENCE DIAGNOSTICS
Sources of influence
Diagnostics: Residuals and the HAT matrix
Diagnostics that determine extent of influence
Influence on performance
What do we do with high influence points?
Exercises
References
CHAPTER 7
NONSTANDARD CONDITIONS, VIOLATIONS OF ASSUMPTIONS,AND TRANSFORMATIONS
Heterogeneous variance: Weighted least squares
Problem with correlated errors (Autocorrelation)
Transformations to improve fit and prediction
Regression with a binary response
Further developments in models with a discrete response (Poisson regression)
Generalized linear models
Failure of normality assumption: Presence of outliers
Measurement errors in the regressor variables
Exercises
References
CHAPTER 8
DETECTING AND COMBATING MULTICOLLINEARITY
Multicollinearity diagnostics
Variance proportions
Further topics concerning multicollinearity
Alternatives to least squares in cases of multicollinearity
Exercises
References
CHAPTER 9
NONLINEAR REGRESSION
Nonlinear least squares
Properties of the least squares estimators
The Gauss-Newton procedure for finding estimates
Other modifications of the Gauss-Newton procedure
Some special classes of nonlinear models
Further considerations in nonlinear regression
Why not transform data to linearize?
Exercises
References
APPENDIX A
SOME SPECIAL CONCEPTS IN MATRIX ALGEBRA
Solutions to simultaneous linear equations
Quadratic form
Eigenvalues and eigenvectors
The inverses of a partitioned matrix
Sherman-Morrison-Woodbury theorem
References
APPENDIX B
SOME SPECIAL MANIPULATIONS
Unbiasedness of the residual mean square
Expected value of residual sum of squares and mean square
for an underspecified model
The maximum likelihood estimator
Development of the PRESS statistic
Computation of s _ i
Dominance of a residual by the corresponding model error .Computation of influence diagnostics
Maximum likelihood estimator in the nonlinear model
Taylor series
Development of the C~-statistic
References
APPENDIX C
STATISTICAL TABLES
INDEX
……[看更多目录]
序言No single statistical tool has received the attention given to regression analysisin the past 25 years. Both practical data analysts and statistical theorists have con-tributed to an unprecedented advancement in this important and dynamic topic.Many volumes have been written by statisticians and scientists with the resultbeing that the arsenal of effective regression methods has increased manyfold.My intent for this second edition is to provide a rather substantial increase inmaterial related to classical regression while continuing to introduce relevant newand modern techniques. I have included major supplements in simple linearregression that deal with simultaneous influence, maximum likelihood estimationof parameters, and the plotting of residuals. In multiple regression, new andsubstantial sections on the use of the general linear hypothesis, indicator variables,the geometry of least squares, and relationship to ANOVA models are added. Inaddition, all new topics are illustrated with the use of real-life data sets andannotated computer printout. In the area of useful modern techniques, additionaltypes of diagnostic residual plots are developed and illustrated, including compo-nent plus residual plots and augmented partial plots. These plots are designedto provide a two-dimensional picture of the role of each regressor in the multipleregression and graphically highlight the need for nonlinearities in the regressionmodel.
文摘插图: