International audienceWe introduce a framework for quasi-Newton forward--backward splitting algorithms (proximal quasi-Newton methods) with a metric induced by diagonal $\pm$ rank-$r$ symmetric positive definite matrices. This special type of metric allows for a highly efficient evaluation of the proximal mapping. The key to this efficiency is a general proximal calculus in the new metric. By using duality, formulas are derived that relate the proximal mapping in a rank-$r$ modified metric to the original metric. We also describe efficient implementations of the proximity calculation for a large class of functions; the implementations exploit the piece-wise linear nature of the dual problem. Then, we apply these results to acceleration of c...
This thesis is concerned with analyzing and improving the performance of quasi-Newton methods for f...
International audienceWe propose an inexact variable-metric proximal point algorithm to accelerate g...
The thesis concerns mainly in finding the numerical solution of non-linear unconstrained problems. ...
International audienceWe introduce a framework for quasi-Newton forward--backward splitting algorith...
International audienceA new result in convex analysis on the calculation of proximity operators in c...
A new result in convex analysis on the calculation of proximity operators in certain scaled norms is...
© 2017, Springer Science+Business Media New York. The forward–backward splitting method (FBS) for mi...
We propose a Forward-Backward Truncated-Newton method (FBTN) for minimizing the sum of two convex fu...
Nonsmooth optimization problems arise in an ever-growing number of applications in science and engin...
The success of Newton’s method for smooth optimization, when Hessians are available, motivated the i...
Nonsmooth optimization problems arise in an ever-growing number of applications in science and engin...
Convex nonsmooth optimization problems, whose solutions live in very high dimensional spaces, have b...
Nonsmooth optimization problems arise in an ever-growing number of applications in science and engi...
Recently several methods were proposed for sparse optimization which make careful use of second-orde...
This paper proposes an implementable proximal quasi-Newton method for minimizing a nondifferentiable...
This thesis is concerned with analyzing and improving the performance of quasi-Newton methods for f...
International audienceWe propose an inexact variable-metric proximal point algorithm to accelerate g...
The thesis concerns mainly in finding the numerical solution of non-linear unconstrained problems. ...
International audienceWe introduce a framework for quasi-Newton forward--backward splitting algorith...
International audienceA new result in convex analysis on the calculation of proximity operators in c...
A new result in convex analysis on the calculation of proximity operators in certain scaled norms is...
© 2017, Springer Science+Business Media New York. The forward–backward splitting method (FBS) for mi...
We propose a Forward-Backward Truncated-Newton method (FBTN) for minimizing the sum of two convex fu...
Nonsmooth optimization problems arise in an ever-growing number of applications in science and engin...
The success of Newton’s method for smooth optimization, when Hessians are available, motivated the i...
Nonsmooth optimization problems arise in an ever-growing number of applications in science and engin...
Convex nonsmooth optimization problems, whose solutions live in very high dimensional spaces, have b...
Nonsmooth optimization problems arise in an ever-growing number of applications in science and engi...
Recently several methods were proposed for sparse optimization which make careful use of second-orde...
This paper proposes an implementable proximal quasi-Newton method for minimizing a nondifferentiable...
This thesis is concerned with analyzing and improving the performance of quasi-Newton methods for f...
International audienceWe propose an inexact variable-metric proximal point algorithm to accelerate g...
The thesis concerns mainly in finding the numerical solution of non-linear unconstrained problems. ...