© 2017, Springer Science+Business Media New York. The forward–backward splitting method (FBS) for minimizing a nonsmooth composite function can be interpreted as a (variable-metric) gradient method over a continuously differentiable function which we call forward–backward envelope (FBE). This allows to extend algorithms for smooth unconstrained optimization and apply them to nonsmooth (possibly constrained) problems. Since the FBE can be computed by simply evaluating forward–backward steps, the resulting methods rely on a similar black-box oracle as FBS. We propose an algorithmic scheme that enjoys the same global convergence properties of FBS when the problem is convex, or when the objective function possesses the Kurdyka–Łojasiewicz prope...
Forward–backward and Douglas–Rachford splitting are methods for structured nonsmooth optimization. W...
This paper proposes two proximal Newton methods for convex nonsmooth optimization problems in compos...
We focus on nonconvex and nonsmooth minimization problems with a composite objective, where the diff...
Nonsmooth optimization problems arise in an ever-growing number of applications in science and engin...
Nonsmooth optimization problems arise in an ever-growing number of applications in science and engin...
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 engi...
We consider the problem of minimizing the s um of a smooth function h with a bounded Hessian and a n...
International audienceWe introduce a framework for quasi-Newton forward--backward splitting algorith...
We extend the well-known BFGS quasi-Newton method and its memory-limited variant LBFGS to the optimi...
The success of Newton’s method for smooth optimization, when Hessians are available, motivated the i...
International audienceIn this paper, we propose a multi-step inertial Forward–Backward splitting alg...
Many methods for solving minimization problems are variants of Newton method, which requires the spe...
We propose a Newton-type alternating minimization algorithm (NAMA) for solving structured nonsmooth ...
We adapt the Douglas–Rachford (DR) splitting method to solve nonconvex feasibility problems by study...
Forward–backward and Douglas–Rachford splitting are methods for structured nonsmooth optimization. W...
This paper proposes two proximal Newton methods for convex nonsmooth optimization problems in compos...
We focus on nonconvex and nonsmooth minimization problems with a composite objective, where the diff...
Nonsmooth optimization problems arise in an ever-growing number of applications in science and engin...
Nonsmooth optimization problems arise in an ever-growing number of applications in science and engin...
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 engi...
We consider the problem of minimizing the s um of a smooth function h with a bounded Hessian and a n...
International audienceWe introduce a framework for quasi-Newton forward--backward splitting algorith...
We extend the well-known BFGS quasi-Newton method and its memory-limited variant LBFGS to the optimi...
The success of Newton’s method for smooth optimization, when Hessians are available, motivated the i...
International audienceIn this paper, we propose a multi-step inertial Forward–Backward splitting alg...
Many methods for solving minimization problems are variants of Newton method, which requires the spe...
We propose a Newton-type alternating minimization algorithm (NAMA) for solving structured nonsmooth ...
We adapt the Douglas–Rachford (DR) splitting method to solve nonconvex feasibility problems by study...
Forward–backward and Douglas–Rachford splitting are methods for structured nonsmooth optimization. W...
This paper proposes two proximal Newton methods for convex nonsmooth optimization problems in compos...
We focus on nonconvex and nonsmooth minimization problems with a composite objective, where the diff...