This paper presents a fully Bayesian approach to regression splines with automatic knot selection in generalized semiparametric models for fundamentally non-Gaussian responses. In a basis function representation of the regression spline we use a B-spline basis. The reversible jump Markov chain Monte Carlo method allows for simultaneous estimation both of the number of knots and the knot placement, together with the unknown basis coefficients determining the shape of the spline. Since the spline can be represented as design matrix times unknown (basis) coefficients, it is straightforward to include additionally a vector of covariates with fixed effects, yielding a semiparametric model. The method is illustrated with data sets from the litera...
A new technique based on Bayesian quantile regression that models the dependence of a quantile of on...
Abstract: P-splines are a popular approach for fitting nonlinear effects of continuous covariates in...
In this paper we extend the GeDS methodology, recently developed by Kaishev et al. (2016) for the No...
Varying-coefficient models provide a flexible framework for semi- and nonparametric generalized regr...
A Bayesian method is presented for the nonparametric modeling of univariate and multivariate non-Gau...
Generalized additive models (GAM) for modelling nonlinear effects of continuous covariates are now w...
In this paper we introduce a new method for automatically selecting knots in spline regression. The ...
In this paper, we study semiparametric regression models with spline smoothing, and determining the ...
2011 Fall.Includes bibliographical references.Semi-parametric and non-parametric function estimation...
Spline smoothing in non- or semiparametric regression models is usually based on the roughness penal...
Regression splines, based on piecewise polynomials, are useful tools to model departures from linear...
A Bayesian approach to nonparametric regression using Penalized splines (P-splines) is presented. Th...
In this paper we extend the GeDS methodology, recently developed by Kaishev et al. [18] for the Norm...
Semiparametric additive regression model is a combination of parametric and nonparametric regression...
An increasingly popular tool for nonparametric smoothing are penalized splines (P-splines) which use...
A new technique based on Bayesian quantile regression that models the dependence of a quantile of on...
Abstract: P-splines are a popular approach for fitting nonlinear effects of continuous covariates in...
In this paper we extend the GeDS methodology, recently developed by Kaishev et al. (2016) for the No...
Varying-coefficient models provide a flexible framework for semi- and nonparametric generalized regr...
A Bayesian method is presented for the nonparametric modeling of univariate and multivariate non-Gau...
Generalized additive models (GAM) for modelling nonlinear effects of continuous covariates are now w...
In this paper we introduce a new method for automatically selecting knots in spline regression. The ...
In this paper, we study semiparametric regression models with spline smoothing, and determining the ...
2011 Fall.Includes bibliographical references.Semi-parametric and non-parametric function estimation...
Spline smoothing in non- or semiparametric regression models is usually based on the roughness penal...
Regression splines, based on piecewise polynomials, are useful tools to model departures from linear...
A Bayesian approach to nonparametric regression using Penalized splines (P-splines) is presented. Th...
In this paper we extend the GeDS methodology, recently developed by Kaishev et al. [18] for the Norm...
Semiparametric additive regression model is a combination of parametric and nonparametric regression...
An increasingly popular tool for nonparametric smoothing are penalized splines (P-splines) which use...
A new technique based on Bayesian quantile regression that models the dependence of a quantile of on...
Abstract: P-splines are a popular approach for fitting nonlinear effects of continuous covariates in...
In this paper we extend the GeDS methodology, recently developed by Kaishev et al. (2016) for the No...