3.1 多元线性回归模型 3.2 回归参数的估计 3.3 参数估计量的性质 3.4 回归方程的显著性检验 3.5 中心化和标准化 3.6 相关阵与偏相关系数 3.7 本章小结与评注

补救序列相关的基本思路 变换存在序列相关的模型,使变换后的新模 型具有无序列相关的随机误差项,这样新模 型满足基本假设,那么运用OLS进行估计以 及进行检验,就能得到理想可信的结果。 从随机误差项入手—变序列相关的随机误差 项为无序列相关的

自20世纪60年代以后,统计学的发展有三个明显的趋势:第一,随着数学的发展,统 计学依赖和吸收的数学方法越来越多;第二,向其他学科领域渗透,或者说以统计学为基 础的边缘学科不断形成。2003年度诺贝尔经济学奖授予两位著名计量经济学家罗伯特恩 格尔( RobertA. Engle和克莱夫格兰杰( Clive Granger)

Assumptions of the classical Linear Model (Clm) e So far, we know that given the Gauss Markov assumptions, OLS IS BLUE e In order to do classical hypothesis testing we need to add another assumption(beyond the Gauss-Markov assumptions) Assume that u is independent of x,x2…,xk and u is normally distributed with zero mean and variance 0: u- Normal(0, 02) Economics 20- Prof anderson

One of the CLRM assumptions is: there is no perfect multicollinearity-no exact linear relationships among explanatory variables, Xs, in a multiple regression. In practice, one rarely encounters perfect multicollinearity, but cases of near or very high multicollinearity where explanatory variables are approximately linearly related frequently arise in many applications

Single equation regression models: -The dependent variable, Y, is expressed as a linear function of one or more explanatory variables, the Xs. Assumption the cause-and-effect relationship, if any, between Y and the Xs is unidirectional: explanatory variables are the cause; the dependent variable is the effect

14.1 Restricted Least Squares (RLS) 1. OLS and RLS ()Unrestricted least squares(ULS) When using the ordinary least square method(OLS) to estimate the parameters, we do not put any prior constraint() or restriction(s) on the parameters. So we can estimate the parameters without any restrictions. This is ULS

12.1 The Nature of Autocorrelation 1. Definition (1) CLRM assumption: No autocorrelation exist in dishurbances ui; E(iμi)=0 Autocorrelation means: E(μiμ)≠0 (2) Autocorrelation is usually associated with time series data, but it can also occur in cross-sectional data, which is called spatial correlation

The models we discussed are models that are linear in parameters; variables Y and Xs do not necessarily have to be linear The price elasticity of demand~the log-linear models The rate of growth~semilog model Functional forms of regression models which are linear in parameters, but not necessarily linear in variables:

Definition (1) Econometrics: economic measurement. (2) Econometrics: the social science in which the tools of economic theory, mathematics, and statistical inference are applied to the analysis of economic phenomena. (3) Econometrics: the result of a certain outlook on the role of economics, consists of the application of mathematical statistics to economic data to lend