In this paper we introduce a new method for automatically selecting knots in spline regression. The approach consists in setting a large number of initial knots and fitting the spline regression through a penalized likelihood procedure called adaptive ridge. The proposed method is similar to penalized spline regression methods (e.g. P-splines), with the noticeable difference that the output is a sparse spline regression with a small number of knots. We show that our method called A-spline, for adaptive splines yields sparse regression models with high interpretability, while having similar predictive performance similar to penalized spline regression methods. A-spline is applied both to simulated and real dataset. A fast and publicly availa...
In high dimensional data modeling, Multivariate Adaptive Regression Splines (MARS) is a popular nonp...
Regression splines, based on piecewise polynomials, are useful tools to model departures from linear...
In high dimensional data modeling, Multivariate Adaptive Regression Splines (MARS) is a well-known n...
In this paper we introduce a new method for automatically selecting knots in spline regression. The ...
Abstract|A critical component of spline smoothing is the choice of knots, especially for curves with...
Using a B-spline representation for splines with knots seen as free variables, the approxima-tion to...
The successful application of statistical variable selection techniques to fit splines is demonstrat...
Number and location of knots strongly impact fitted values obtained from spline regression methods. ...
Number and location of knots strongly impact on fitted values obtained from spline regression method...
In this paper we study the class of penalized regression spline estimators, which enjoy similarities...
We study the class of penalized spline estimators, which enjoy similarities to both regression splin...
Regression splines have an established value for producing quality fit at a relatively low-degree po...
This paper presents a fully Bayesian approach to regression splines with automatic knot selection in...
Non-linear regression modeling is common in epidemiology for prediction purposes or estimating relat...
The varying coefficient model is a potent dimension reduction tool for nonparametric modeling and ha...
In high dimensional data modeling, Multivariate Adaptive Regression Splines (MARS) is a popular nonp...
Regression splines, based on piecewise polynomials, are useful tools to model departures from linear...
In high dimensional data modeling, Multivariate Adaptive Regression Splines (MARS) is a well-known n...
In this paper we introduce a new method for automatically selecting knots in spline regression. The ...
Abstract|A critical component of spline smoothing is the choice of knots, especially for curves with...
Using a B-spline representation for splines with knots seen as free variables, the approxima-tion to...
The successful application of statistical variable selection techniques to fit splines is demonstrat...
Number and location of knots strongly impact fitted values obtained from spline regression methods. ...
Number and location of knots strongly impact on fitted values obtained from spline regression method...
In this paper we study the class of penalized regression spline estimators, which enjoy similarities...
We study the class of penalized spline estimators, which enjoy similarities to both regression splin...
Regression splines have an established value for producing quality fit at a relatively low-degree po...
This paper presents a fully Bayesian approach to regression splines with automatic knot selection in...
Non-linear regression modeling is common in epidemiology for prediction purposes or estimating relat...
The varying coefficient model is a potent dimension reduction tool for nonparametric modeling and ha...
In high dimensional data modeling, Multivariate Adaptive Regression Splines (MARS) is a popular nonp...
Regression splines, based on piecewise polynomials, are useful tools to model departures from linear...
In high dimensional data modeling, Multivariate Adaptive Regression Splines (MARS) is a well-known n...