AbstractMixed norms are used to exploit in an easy way, both structure and sparsity in the framework of regression problems, and introduce implicitly couplings between regression coefficients. Regression is done through optimization problems, and corresponding algorithms are described and analyzed. Beside the classical sparse regression problem, multi-layered expansion on unions of dictionaries of signals are also considered. These sparse structured expansions are done subject to an exact reconstruction constraint, using a modified FOCUSS algorithm. When the mixed norms are used in the framework of regularized inverse problem, a thresholded Landweber iteration is used to minimize the corresponding variational problem
Image restoration problems are often solved by finding the minimizer of a suitable objective functio...
To restrict ourselves to the regime of sparse solutions has become the new paradigm for modern stati...
We investigate structured sparsity methods for variable selection in regression problems where the t...
AbstractMixed norms are used to exploit in an easy way, both structure and sparsity in the framework...
nombre de pages : 27 To appear in: Applied and Computational Harmonic Analysis DOI : 10.1016/j.acha....
nombre de pages : 14International audienceSparse regression often uses $\ell_p$ norm priors (with p<...
We present a new algorithm for minimizing a convex loss-function subject to regularization. Our fram...
International audienceWe consider the empirical risk minimization problem for linear supervised lear...
Recovering structured models (e.g., sparse or group-sparse vectors, low-rank matrices) given a few l...
The purpose of this chapter is to present a theoretical framework for the problem of learning from e...
The past decade has witnessed the emergence of compressed sensing as a way of acquiring sparsely rep...
Due to the increasing availability of data sets with a large number of variables, sparse model estim...
International audienceSparse and structured signal expansions on dictionaries can be obtained throug...
The topic of recovery of a structured model given a small number of linear observations has been wel...
We investigate implicit regularization schemes for gradient descent methods applied to unpenalized l...
Image restoration problems are often solved by finding the minimizer of a suitable objective functio...
To restrict ourselves to the regime of sparse solutions has become the new paradigm for modern stati...
We investigate structured sparsity methods for variable selection in regression problems where the t...
AbstractMixed norms are used to exploit in an easy way, both structure and sparsity in the framework...
nombre de pages : 27 To appear in: Applied and Computational Harmonic Analysis DOI : 10.1016/j.acha....
nombre de pages : 14International audienceSparse regression often uses $\ell_p$ norm priors (with p<...
We present a new algorithm for minimizing a convex loss-function subject to regularization. Our fram...
International audienceWe consider the empirical risk minimization problem for linear supervised lear...
Recovering structured models (e.g., sparse or group-sparse vectors, low-rank matrices) given a few l...
The purpose of this chapter is to present a theoretical framework for the problem of learning from e...
The past decade has witnessed the emergence of compressed sensing as a way of acquiring sparsely rep...
Due to the increasing availability of data sets with a large number of variables, sparse model estim...
International audienceSparse and structured signal expansions on dictionaries can be obtained throug...
The topic of recovery of a structured model given a small number of linear observations has been wel...
We investigate implicit regularization schemes for gradient descent methods applied to unpenalized l...
Image restoration problems are often solved by finding the minimizer of a suitable objective functio...
To restrict ourselves to the regime of sparse solutions has become the new paradigm for modern stati...
We investigate structured sparsity methods for variable selection in regression problems where the t...