Add to ORKGThe max-norm was proposed as a convex matrix regularizer in [1] and was shown to be empirically superior to the trace-norm for collaborative filtering problems. Although the max-norm can be computed in polynomial time, there are currently no practical algorithms for solving large-scale optimization problems that incorporate the max-norm. The present work uses a factorization technique of Burer and Monteiro [2] to devise scalable first-order algorithms for convex programs involving the max-norm. These algorithms are applied to solve huge collaborative filtering, graph cut, and clustering problems. Empirically, the new methods outperform mature techniques from all three areas
The emergence of modern large-scale datasets has led to a huge interest in the problem of learning h...
We study norms that can be used as penalties in machine learning problems. In particular, we conside...
We introduce a new sparse recovery paradigm, called Normed Pursuits, where efficient algorithms from...
The max-norm was proposed as a convex matrix regularizer in [1] and was shown to be empirically supe...
International audienceThe paper addresses the problem of low-rank trace norm minimization. We propos...
International audienceWe consider the minimization of a smooth loss with trace-norm regularization, ...
We introduce a new family of matrix norms, the “local max ” norms, generalizing existing methods suc...
Optimization problems with rank constraints appear in many diverse fields such as control, machine l...
Optimization problems with rank constraints appear in many diverse fields such as control, machine l...
Matrix completion has been well studied under the uniform sampling model and the trace-norm regulari...
Thesis: Ph. D. in Mathematics and Operations Research, Massachusetts Institute of Technology, Depart...
Training machine learning methods boils down to solving optimization problems whose objective functi...
Abstract. We are interested in supervised ranking with the following twist: our goal is to design al...
We propose a convex optimization formulation with the Ky Fan 2-k-norm and l1-norm to find k largest ...
In this tutorial paper, we consider the problem of minimizing the rank of a matrix over a convex set...
The emergence of modern large-scale datasets has led to a huge interest in the problem of learning h...
We study norms that can be used as penalties in machine learning problems. In particular, we conside...
We introduce a new sparse recovery paradigm, called Normed Pursuits, where efficient algorithms from...
The max-norm was proposed as a convex matrix regularizer in [1] and was shown to be empirically supe...
International audienceThe paper addresses the problem of low-rank trace norm minimization. We propos...
International audienceWe consider the minimization of a smooth loss with trace-norm regularization, ...
We introduce a new family of matrix norms, the “local max ” norms, generalizing existing methods suc...
Optimization problems with rank constraints appear in many diverse fields such as control, machine l...
Optimization problems with rank constraints appear in many diverse fields such as control, machine l...
Matrix completion has been well studied under the uniform sampling model and the trace-norm regulari...
Thesis: Ph. D. in Mathematics and Operations Research, Massachusetts Institute of Technology, Depart...
Training machine learning methods boils down to solving optimization problems whose objective functi...
Abstract. We are interested in supervised ranking with the following twist: our goal is to design al...
We propose a convex optimization formulation with the Ky Fan 2-k-norm and l1-norm to find k largest ...
In this tutorial paper, we consider the problem of minimizing the rank of a matrix over a convex set...
The emergence of modern large-scale datasets has led to a huge interest in the problem of learning h...
We study norms that can be used as penalties in machine learning problems. In particular, we conside...
We introduce a new sparse recovery paradigm, called Normed Pursuits, where efficient algorithms from...