A method is introduced for variable selection and prediction in linear regression problems where the number of predictors can be much larger than the number of observations. The methodology involves minimising a penalised Euclidean distance, where the penalty is the geometric mean of the $\ell_1$ and $\ell_2$ norms of the regression coefficients. This particular formulation exhibits a grouping effect, which is useful for model selection in high dimensional problems. Also, an important result is a model consistency theorem, which does not require an estimate of the noise standard deviation. An algorithm for estimation is described, which involves thresholding to obtain a sparse solution. Practical performances of variable selection and pred...
Statistical model selection is a great challenge when the number of accessible measurements is much ...
In a wide range of applications, datasets are generated for which the number of variables p exceeds ...
Recently, Hwang et al. (2009) proposed a variable selection method for high dimensional linear regre...
A method is introduced for variable selection and prediction in linear regression problems where the...
ABSTRACT. A new method is proposed for variable screening, variable selection and prediction in line...
This thesis presents a new approach to fitting linear models, called “pace regression”, which also o...
Global Fréchet regression is an extension of linear regression to cover more general types of respon...
A new regularization method for regression models is proposed. The criterion to be minimized contain...
A new regularization method for regression models is proposed. The criterion to be minimized contain...
In high dimensional regression problems penalization techniques are a useful tool for estimation and...
In sparse high-dimensional data, the selection of a model can lead to an overestimation of the numbe...
We propose penalized empirical likelihood for parameter estimation and variable selection for proble...
With advanced capability in data collection, applications of linear regression analysis now often in...
Generalized linear models are popular for modelling a large variety of data. We consider variable se...
Data types that lie in metric spaces but not in vector spaces are difficult to use within the usual ...
Statistical model selection is a great challenge when the number of accessible measurements is much ...
In a wide range of applications, datasets are generated for which the number of variables p exceeds ...
Recently, Hwang et al. (2009) proposed a variable selection method for high dimensional linear regre...
A method is introduced for variable selection and prediction in linear regression problems where the...
ABSTRACT. A new method is proposed for variable screening, variable selection and prediction in line...
This thesis presents a new approach to fitting linear models, called “pace regression”, which also o...
Global Fréchet regression is an extension of linear regression to cover more general types of respon...
A new regularization method for regression models is proposed. The criterion to be minimized contain...
A new regularization method for regression models is proposed. The criterion to be minimized contain...
In high dimensional regression problems penalization techniques are a useful tool for estimation and...
In sparse high-dimensional data, the selection of a model can lead to an overestimation of the numbe...
We propose penalized empirical likelihood for parameter estimation and variable selection for proble...
With advanced capability in data collection, applications of linear regression analysis now often in...
Generalized linear models are popular for modelling a large variety of data. We consider variable se...
Data types that lie in metric spaces but not in vector spaces are difficult to use within the usual ...
Statistical model selection is a great challenge when the number of accessible measurements is much ...
In a wide range of applications, datasets are generated for which the number of variables p exceeds ...
Recently, Hwang et al. (2009) proposed a variable selection method for high dimensional linear regre...