半参数回归

目前已有许多不同的半参数回归方法。最流行的方法是部分线性模型、指数模型和变系数模型。

部分线性模型如下

${\displaystyle Y_{i}=X'_{i}\beta +g\left(Z_{i}\right)+u_{i},\,\quad i=1,\ldots ,n,\,}$ 

其中${\displaystyle Y_{i}}$ 是因变量，${\displaystyle X_{i}}$ 是解释变量的${\displaystyle p\times 1}$ 向量，${\displaystyle \beta }$ 是未知参数的${\displaystyle p\times 1}$ 向量，${\displaystyle Z_{i}\in \operatorname {R} ^{q}}$ 。部分线性模型的参数部分由参数向量${\displaystyle \beta }$ 给出，而非参数部分是未知函数${\displaystyle g\left(Z_{i}\right)}$ 。假设数据与${\displaystyle E\left(u_{i}|X_{i},Z_{i}\right)=0}$ 独立同分布，模型允许未知形式的条件异方差误差过程${\displaystyle E\left(u_{i}^{2}|x,z\right)=\sigma ^{2}\left(x,z\right)}$ 。这类模型由Robinson (1988)提出，并由Racine & Li (2007)扩展到处理分类协变量。

这种方法先获得${\displaystyle \beta }$ 的${\displaystyle {\sqrt {n}}}$ 一致估计量，然后用适当的非参数回归方法，从${\displaystyle Y_{i}-X'_{i}{\hat {\beta }}}$ 对${\displaystyle z}$ 的非参数回归中推出${\displaystyle g\left(Z_{i}\right)}$ 的估计量。^[1]

单一指数模型的形式是

${\displaystyle Y=g\left(X'\beta _{0}\right)+u,\,}$ 

其中${\displaystyle Y}$ 、${\displaystyle X}$ 、${\displaystyle \beta _{0}}$ 的定义与上文相同，误差项${\displaystyle u}$ 满足${\displaystyle E\left(u|X\right)=0}$ 。单一指数模型得名于模型的参数部分${\displaystyle x'\beta }$ ，是标量单指数。非参数部分是未知函数${\displaystyle g\left(\cdot \right)}$ 。

市村(1993)提出的单一指数模型法如下。考虑${\displaystyle y}$ 连续情形，给定函数${\displaystyle g\left(\cdot \right)}$ 的已知形式，${\displaystyle \beta _{0}}$ 可用非线性最小二乘法估计，使函数

${\displaystyle \sum _{i=1}\left(Y_{i}-g\left(X'_{i}\beta \right)\right)^{2}.}$ 

最小化。${\displaystyle g\left(\cdot \right)}$ 的函数形式未知，需要估计。对给定${\displaystyle \beta }$ 值，函数估计值可用核密度估计得到，为

${\displaystyle G\left(X'_{i}\beta \right)=E\left(Y_{i}|X'_{i}\beta \right)=E\left[g\left(X'_{i}\beta _{o}\right)|X'_{i}\beta \right]}$ 

市村(1993)建议用下式估计${\displaystyle g\left(X'_{i}\beta \right)}$ ：

${\displaystyle {\hat {G}}_{-i}\left(X'_{i}\beta \right),\,}$ 

为${\displaystyle G\left(X'_{i}\beta \right)}$ 的留一非参数核估计量.

Klein & Spady (1993)提出，若因变量${\displaystyle y}$ 是二元的，并假设${\displaystyle X_{i}}$ 、${\displaystyle u_{i}}$ 独立，则可用最大似然估计法估计${\displaystyle \beta }$ 。对数似然函数为

${\displaystyle L\left(\beta \right)=\sum _{i}\left(1-Y_{i}\right)\ln \left(1-{\hat {g}}_{-i}\left(X'_{i}\beta \right)\right)+\sum _{i}Y_{i}\ln \left({\hat {g}}_{-i}\left(X'_{i}\beta \right)\right),}$ 

其中${\displaystyle {\hat {g}}_{-i}\left(X'_{i}\beta \right)}$ 是留一估计量。

Hastie & Tibshirani (1993)提出了一种平滑系数模型

${\displaystyle Y_{i}=\alpha \left(Z_{i}\right)+X'_{i}\beta \left(Z_{i}\right)+u_{i}=\left(1+X'_{i}\right)\left({\begin{array}{c}\alpha \left(Z_{i}\right)\\\beta \left(Z_{i}\right)\end{array}}\right)+u_{i}=W'_{i}\gamma \left(Z_{i}\right)+u_{i},}$ 

其中${\displaystyle X_{i}}$ 是${\displaystyle k\times 1}$ 向量，${\displaystyle \beta \left(z\right)}$ 是${\displaystyle z}$ 的未定平滑函数向量。

${\displaystyle \gamma \left(\cdot \right)}$ 可表为

${\displaystyle \gamma \left(Z_{i}\right)=\left(E\left[W_{i}W'_{i}|Z_{i}\right]\right)^{-1}E\left[W_{i}Y_{i}|Z_{i}\right].}$ 

• 非参数回归

• Robinson, P.M. Root-n Consistent Semiparametric Regression. Econometrica (The Econometric Society). 1988, 56 (4): 931–954. JSTOR 1912705. doi:10.2307/1912705. 
• Li, Qi; Racine, Jeffrey S. Nonparametric Econometrics: Theory and Practice. Princeton University Press. 2007. ISBN 978-0-691-12161-1. 
• Racine, J.S.; Qui, L. A Partially Linear Kernel Estimator for Categorical Data. Unpublished Manuscript, Mcmaster University. 2007. 
• Ichimura, H. Semiparametric Least Squares (SLS) and Weighted SLS Estimation of Single Index Models. Journal of Econometrics. 1993, 58 (1–2): 71–120. doi:10.1016/0304-4076(93)90114-K. 
• Klein, R. W.; R. H. Spady. An Efficient Semiparametric Estimator for Binary Response Models. Econometrica (The Econometric Society). 1993, 61 (2): 387–421. CiteSeerX 10.1.1.318.4925  . JSTOR 2951556. doi:10.2307/2951556. 
• Hastie, T.; R. Tibshirani. Varying-Coefficient Models. Journal of the Royal Statistical Society, Series B. 1993, 55: 757–796.