Regression splines, based on piecewise polynomials, are useful tools to model departures from linearity in the regression context. The number and location of the knots can be of interest in many contexts since they can detect possible change points in the relationship between the variables. This work is focused on the estimate of both number and location of knots in the simple case where linear truncated splines are chosen to represent the relationship, in this case, the position of the knot detects a change in the slope. In a Bayesian context, we propose a two-step procedure, to first determine the true number of knots and then to fit the final model estimating simultaneously location of knots and regression and spline coefficients
A new method for Computer Aided Geometric Design of least squares (LS) splines with va...
We model sparse functional data from multiple subjects with a mixed-effects regression spline. In th...
Confidence intervals and point estimation for a regression function based on polynomial splines with...
Regression splines, based on piecewise polynomials, are useful tools to model departures from linear...
In many practical problems related to supervised statistical learning, we are interested in predicti...
Using a B-spline representation for splines with knots seen as free variables, the approxima-tion to...
This paper presents a fully Bayesian approach to regression splines with automatic knot selection in...
7Spline functions, defined as piecewise polynomials with a fixed degree, whose joint points are call...
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 ...
Regression splines have an established value for producing quality fit at a relatively low-degree po...
The successful application of statistical variable selection techniques to fit splines is demonstrat...
Non-linear regression modeling is common in epidemiology for prediction purposes or estimating relat...
B-splines constitute an appealing method for the nonparametric estimation of a range of statis-tical...
This thesis explores variations on a Bayesian regression model used to estimate the mean box length ...
A new method for Computer Aided Geometric Design of least squares (LS) splines with va...
We model sparse functional data from multiple subjects with a mixed-effects regression spline. In th...
Confidence intervals and point estimation for a regression function based on polynomial splines with...
Regression splines, based on piecewise polynomials, are useful tools to model departures from linear...
In many practical problems related to supervised statistical learning, we are interested in predicti...
Using a B-spline representation for splines with knots seen as free variables, the approxima-tion to...
This paper presents a fully Bayesian approach to regression splines with automatic knot selection in...
7Spline functions, defined as piecewise polynomials with a fixed degree, whose joint points are call...
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 ...
Regression splines have an established value for producing quality fit at a relatively low-degree po...
The successful application of statistical variable selection techniques to fit splines is demonstrat...
Non-linear regression modeling is common in epidemiology for prediction purposes or estimating relat...
B-splines constitute an appealing method for the nonparametric estimation of a range of statis-tical...
This thesis explores variations on a Bayesian regression model used to estimate the mean box length ...
A new method for Computer Aided Geometric Design of least squares (LS) splines with va...
We model sparse functional data from multiple subjects with a mixed-effects regression spline. In th...
Confidence intervals and point estimation for a regression function based on polynomial splines with...