Nonparametric regression using linear combinations of basis functions

This paper discusses a Bayesian approach to nonparametric regression initially proposed by Smith and Kohn (1996. Journal of Econometrics 75: 317–344). In this approach the regression function is represented as a linear combination of basis terms. The basis terms can be univariate or multivariate functions and can include polynomials, natural splines and radial basis functions. A Bayesian hierarchical model is used such that the coefficient of each basis term can be zero with positive prior probability. The presence of basis terms in the model is determined by latent indicator variables. The posterior mean is estimated by Markov chain Monte Carlo simulation because it is computationally intractable to compute the posterior mean analytically unless a small number of basis terms is used. The present article updates the work of Smith and Kohn (1996. Journal of Econometrics 75: 317–344) to take account of work by us and others over the last three years. A careful discussion is given to all aspects of the model specification, function estimation and the use of sampling schemes. In particular, new sampling schemes are introduced to carry out the variable selection methodology.

[1]  W. K. Hastings,et al.  Monte Carlo Sampling Methods Using Markov Chains and Their Applications , 1970 .

[2]  P. Peskun,et al.  Optimum Monte-Carlo sampling using Markov chains , 1973 .

[3]  B. D. Finetti,et al.  Bayesian inference and decision techniques : essays in honor of Bruno de Finetti , 1986 .

[4]  M. J. D. Powell,et al.  Radial basis functions for multivariable interpolation: a review , 1987 .

[5]  T. J. Mitchell,et al.  Bayesian Variable Selection in Linear Regression , 1988 .

[6]  J. Friedman,et al.  FLEXIBLE PARSIMONIOUS SMOOTHING AND ADDITIVE MODELING , 1989 .

[7]  G. Wahba Spline models for observational data , 1990 .

[8]  J. Freidman,et al.  Multivariate adaptive regression splines , 1991 .

[9]  E. George,et al.  Journal of the American Statistical Association is currently published by American Statistical Association. , 2007 .

[10]  A. O'Hagan,et al.  Fractional Bayes factors for model comparison , 1995 .

[11]  P. Green Reversible jump Markov chain Monte Carlo computation and Bayesian model determination , 1995 .

[12]  R. Kohn,et al.  Nonparametric regression using Bayesian variable selection , 1996 .

[13]  Young K. Truong,et al.  Polynomial splines and their tensor products in extended linear modeling: 1994 Wald memorial lecture , 1997 .

[14]  R. Kohn,et al.  A Bayesian approach to nonparametric bivariate regression , 1997 .

[15]  E. George,et al.  APPROACHES FOR BAYESIAN VARIABLE SELECTION , 1997 .

[16]  Adrian F. M. Smith,et al.  Automatic Bayesian curve fitting , 1998 .

[17]  C. C. Homes,et al.  Bayesian Radial Basis Functions of Variable Dimension , 1998, Neural Computation.

[18]  R. Kohn,et al.  Nonparametric seemingly unrelated regression , 2000 .