We propose the Factor Augmented (sparse linear) Regression Model (FARM) that not only admits both the latent factor regression and sparse linear regression as special cases but also bridges dimension reduction and sparse regression together. We provide theoretical guarantees for the estimation of our model under the existence of sub-Gaussian and heavy-tailed noises (with bounded (1+ϑ)-th moment, for all ϑ>0) respectively. In addition, the existing works on supervised learning often assume the latent factor regression or sparse linear regression is the true underlying model without justifying its adequacy. To fill in such an important gap on high-dimensional inference, we also leverage our model as the alternative model to test the sufficien...
In high dimensional statistics, estimation and inference are often done by making use of the underly...
Abstract—Many practical methods for finding maximally sparse coefficient expansions involve solving ...
<p>Networks are a unifying framework for modeling complex systems and network inference problems are...
Due to the increasing availability of data sets with a large number of variables, sparse model estim...
Factor and sparse models are two widely used methods to impose a low-dimensional structure in high-d...
We present a new class of models for high-dimensional nonparametric regression and classification ca...
We reconcile the two worlds of dense and sparse modeling by exploiting the positive aspects of both....
We propose a generalization of the linear panel quantile regression model to accommodate both sparse...
Abstract The problem of approximating high-dimensional data with a low-dimensional representa-tion i...
202 pagesThis work first studies the finite-sample properties of the risk of the minimum-norm interp...
Sparse principal component analysis is a very active research area in the last decade. It produces c...
We present a new class of models for high-dimensional nonparametric regression and classification ca...
298 pagesThis work first introduces a novel estimation method, called $LOVE$, of the entries and s...
In high-dimensional data, structured noise caused by observed and unobserved factors affecting multi...
We study flexible Bayesian methods that are amenable to a wide range of learning problems involving ...
In high dimensional statistics, estimation and inference are often done by making use of the underly...
Abstract—Many practical methods for finding maximally sparse coefficient expansions involve solving ...
<p>Networks are a unifying framework for modeling complex systems and network inference problems are...
Due to the increasing availability of data sets with a large number of variables, sparse model estim...
Factor and sparse models are two widely used methods to impose a low-dimensional structure in high-d...
We present a new class of models for high-dimensional nonparametric regression and classification ca...
We reconcile the two worlds of dense and sparse modeling by exploiting the positive aspects of both....
We propose a generalization of the linear panel quantile regression model to accommodate both sparse...
Abstract The problem of approximating high-dimensional data with a low-dimensional representa-tion i...
202 pagesThis work first studies the finite-sample properties of the risk of the minimum-norm interp...
Sparse principal component analysis is a very active research area in the last decade. It produces c...
We present a new class of models for high-dimensional nonparametric regression and classification ca...
298 pagesThis work first introduces a novel estimation method, called $LOVE$, of the entries and s...
In high-dimensional data, structured noise caused by observed and unobserved factors affecting multi...
We study flexible Bayesian methods that are amenable to a wide range of learning problems involving ...
In high dimensional statistics, estimation and inference are often done by making use of the underly...
Abstract—Many practical methods for finding maximally sparse coefficient expansions involve solving ...
<p>Networks are a unifying framework for modeling complex systems and network inference problems are...