Semiparametric regression explained

In statistics, semiparametric regression includes regression models that combine parametric and nonparametric models. They are often used in situations where the fully nonparametric model may not perform well or when the researcher wants to use a parametric model but the functional form with respect to a subset of the regressors or the density of the errors is not known. Semiparametric regression models are a particular type of semiparametric modelling and, since semiparametric models contain a parametric component, they rely on parametric assumptions and may be misspecified and inconsistent, just like a fully parametric model.

Methods

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

A partially linear model is given by

Y_i=X'_i\beta+g\left(Z_i\right)+u_i, i=1,\ldots,n,

where

Y_i

is the dependent variable,

X_i

is a

p x 1

vector of explanatory variables,

\beta

is a

p x 1

vector of unknown parameters and

Z_i\in\operatorname{R}^q

. The parametric part of the partially linear model is given by the parameter vector

\beta

while the nonparametric part is the unknown function

g\left(Z_i\right)

. The data is assumed to be i.i.d. with

E\left(u_i|X_i,Z_i\right)=0

and the model allows for a conditionally heteroskedastic error process

	2
E\left(u
	i

|x,z\right)=\sigma²\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

\sqrt{n}

consistent estimator of

\beta

and then deriving an estimator of

g\left(Z_i\right)

from the nonparametric regression of

Y_i-X'_i\hat{\beta}

using an appropriate nonparametric regression method.^[1]

Index models

A single index model takes the form

Y=g\left(X'\beta₀\right)+u,

where

and

\beta₀

are defined as earlier and the error term

satisfies

E\left(u|X\right)=0

. The single index model takes its name from the parametric part of the model

x'\beta

which is a scalar single index. The nonparametric part is the unknown function

g\left( ⋅ \right)

Ichimura's method

The single index model method developed by Ichimura (1993) is as follows. Consider the situation in which

is continuous. Given a known form for the function

g\left( ⋅ \right)

\beta₀

could be estimated using the nonlinear least squares method to minimize the function

\sum_i=1\left(Y_i-g\left(X'_i\beta\right)\right)^2.

Since the functional form of

g\left( ⋅ \right)

is not known, we need to estimate it. For a given value for

\beta

an estimate of the function

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

g\left(X'_i\beta\right)

with

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

the leave-one-out nonparametric kernel estimator of

G\left(X'_i\beta\right)

Klein and Spady's estimator

If the dependent variable

is binary and

X_i

and

u_i

are assumed to be independent, Klein and Spady (1993) propose a technique for estimating

\beta

using maximum likelihood methods. The log-likelihood function is given by

L\left(\beta\right)=\sum_i\left(1-Y_{i\right)ln\left(1-\hat{g}}_-i\left(X'_{i\beta\right)\right)}+\sum_iY_{iln\left(\hat{g}}_-i\left(X'_i\beta\right)\right),

where

\hat{g}_-i\left(X'_i\beta\right)

is the leave-one-out estimator.

Smooth coefficient/varying coefficient models

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

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

X_i

is a

k x 1

vector and

\beta\left(z\right)

is a vector of unspecified smooth functions of

\gamma\left( ⋅ \right)

may be expressed as

\gamma\left(Z_i\right)=\left(E\left[W_iW'_i|Z_i\right]\right)^-1E\left[W_iY_i|Z_i\right].

References

Robinson . P.M. . Root-n Consistent Semiparametric Regression . Econometrica . 56 . 4 . 931–954 . 1988 . 10.2307/1912705 . 1912705 . The Econometric Society .
Book: Li , Qi . Racine, Jeffrey S. . Nonparametric Econometrics: Theory and Practice . Princeton University Press . 2007 . 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 . 58 . 1–2 . 71–120 . 1993 . 10.1016/0304-4076(93)90114-K .
Klein . R. W. . R. H. Spady . An Efficient Semiparametric Estimator for Binary Response Models . Econometrica . 61 . 2 . 387–421 . 1993 . 10.2307/2951556 . 2951556 . The Econometric Society . 10.1.1.318.4925 .
Hastie . T. . R. Tibshirani . Varying-Coefficient Models . Journal of the Royal Statistical Society, Series B . 55 . 757–796 . 1993 .

Notes and References

See Li and Racine (2007) for an in-depth look at nonparametric regression methods.

Semiparametric regression explained

Methods

Partially linear models

Index models

Ichimura's method

Klein and Spady's estimator

Smooth coefficient/varying coefficient models

See also

References

Notes and References