Many different semiparametric regression methods have been proposed and developed. The most popular methods are the partially linear, index and varying coefficient models.

Partially linear models edit

A partially linear model is given by

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

where ${\displaystyle Y_{i}}$  is the dependent variable, ${\displaystyle X_{i}}$  is a ${\displaystyle p\times 1}$  vector of explanatory variables, ${\displaystyle \beta }$  is a ${\displaystyle p\times 1}$  vector of unknown parameters and ${\displaystyle Z_{i}\in \operatorname {R} ^{q}}$ . The parametric part of the partially linear model is given by the parameter vector ${\displaystyle \beta }$  while the nonparametric part is the unknown function ${\displaystyle g\left(Z_{i}\right)}$ . The data is assumed to be i.i.d. with ${\displaystyle E\left(u_{i}|X_{i},Z_{i}\right)=0}$  and the model allows for a conditionally heteroskedastic error process ${\displaystyle E\left(u_{i}^{2}|x,z\right)=\sigma ^{2}\left(x,z\right)}$  of unknown form. This type of model was proposed by Robinson (1988) and extended to handle categorical covariates by Racine and Li (2007).

This method is implemented by obtaining a ${\displaystyle {\sqrt {n}}}$  consistent estimator of ${\displaystyle \beta }$  and then deriving an estimator of ${\displaystyle g\left(Z_{i}\right)}$  from the nonparametric regression of ${\displaystyle Y_{i}-X'_{i}{\hat {\beta }}}$  on ${\displaystyle z}$  using an appropriate nonparametric regression method.^[1]

Index models edit

A single index model takes the form

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

where ${\displaystyle Y}$ , ${\displaystyle X}$  and ${\displaystyle \beta _{0}}$  are defined as earlier and the error term ${\displaystyle u}$  satisfies ${\displaystyle E\left(u|X\right)=0}$ . The single index model takes its name from the parametric part of the model ${\displaystyle x'\beta }$  which is a scalar single index. The nonparametric part is the unknown function ${\displaystyle g\left(\cdot \right)}$ .

Ichimura's method edit

The single index model method developed by Ichimura (1993) is as follows. Consider the situation in which ${\displaystyle y}$  is continuous. Given a known form for the function ${\displaystyle g\left(\cdot \right)}$ , ${\displaystyle \beta _{0}}$  could be estimated using the nonlinear least squares method to minimize the function

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

Since the functional form of ${\displaystyle g\left(\cdot \right)}$  is not known, we need to estimate it. For a given value for ${\displaystyle \beta }$  an estimate of the function

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

using kernel method. Ichimura (1993) proposes estimating ${\displaystyle g\left(X'_{i}\beta \right)}$  with

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

the leave-one-out nonparametric kernel estimator of ${\displaystyle G\left(X'_{i}\beta \right)}$ .

Klein and Spady's estimator edit

If the dependent variable ${\displaystyle y}$  is binary and ${\displaystyle X_{i}}$  and ${\displaystyle u_{i}}$  are assumed to be independent, Klein and Spady (1993) propose a technique for estimating ${\displaystyle \beta }$  using maximum likelihood methods. The log-likelihood function is given by

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

where ${\displaystyle {\hat {g}}_{-i}\left(X'_{i}\beta \right)}$  is the leave-one-out estimator.

Smooth coefficient/varying coefficient models edit

Hastie and Tibshirani (1993) propose a smooth coefficient model given by

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

where ${\displaystyle X_{i}}$  is a ${\displaystyle k\times 1}$  vector and ${\displaystyle \beta \left(z\right)}$  is a vector of unspecified smooth functions of ${\displaystyle z}$ .

${\displaystyle \gamma \left(\cdot \right)}$  may be expressed as

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

• Nonparametric regression
• Effective degree of freedom

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