International audienceA number of recent works have emphasized the prominent role played by the Kurdyka-Lojasiewicz inequality for proving the convergence of iterative algorithms solving possibly nonsmooth/nonconvex optimization problems. In this work, we consider the minimization of an objective function satisfying this property, which is a sum of a non necessarily convex differentiable function and a non necessarily differentiable or convex function. The latter function is expressed as a separable sum of functions of blocks of variables. Such an optimization problem can be addressed with the Forward-Backward algorithm which can be accelerated thanks to the use of variable metrics derived from the Majorize-Minimize principle. We propose to...
Abstract. Nonconvex optimization problems arise in many areas of computational science and engineeri...
© 2017, Springer Science+Business Media New York. The forward–backward splitting method (FBS) for mi...
A novel iterative algorithm for the solution of convex or non-convex optimization problems is presen...
International audienceA number of recent works have emphasized the prominent role played by the Kurd...
A number of recent works have emphasized the prominent role played by the Kurdyka-Lojasiewicz inequa...
International audienceWe consider the minimization of a function $G$ defined on $R^N$, which is the ...
We consider the minimization of a function G defined on RN, which is the sum of a (non necessarily c...
Forward-backward methods are a very useful tool for the minimization of a functional given by the su...
Forward-backward methods are valid tools to solve a variety of optimization problems where the objec...
This paper deals with a general framework for inexact forward-backward algorithms aimed at minimizin...
One of the most popular approaches for the minimization of a convex functional given by the sum of a...
In this paper we propose an alternating block version of a variable metric linesearch proximal gradi...
Abstract. We propose a forward-backward proximal-type algorithm with inertial/memory effects for min...
In view of the minimization of a function which is the sum of a differentiable function $f$ and a c...
International audienceMany inverse problems require to minimize a criterion being the sum of a non n...
Abstract. Nonconvex optimization problems arise in many areas of computational science and engineeri...
© 2017, Springer Science+Business Media New York. The forward–backward splitting method (FBS) for mi...
A novel iterative algorithm for the solution of convex or non-convex optimization problems is presen...
International audienceA number of recent works have emphasized the prominent role played by the Kurd...
A number of recent works have emphasized the prominent role played by the Kurdyka-Lojasiewicz inequa...
International audienceWe consider the minimization of a function $G$ defined on $R^N$, which is the ...
We consider the minimization of a function G defined on RN, which is the sum of a (non necessarily c...
Forward-backward methods are a very useful tool for the minimization of a functional given by the su...
Forward-backward methods are valid tools to solve a variety of optimization problems where the objec...
This paper deals with a general framework for inexact forward-backward algorithms aimed at minimizin...
One of the most popular approaches for the minimization of a convex functional given by the sum of a...
In this paper we propose an alternating block version of a variable metric linesearch proximal gradi...
Abstract. We propose a forward-backward proximal-type algorithm with inertial/memory effects for min...
In view of the minimization of a function which is the sum of a differentiable function $f$ and a c...
International audienceMany inverse problems require to minimize a criterion being the sum of a non n...
Abstract. Nonconvex optimization problems arise in many areas of computational science and engineeri...
© 2017, Springer Science+Business Media New York. The forward–backward splitting method (FBS) for mi...
A novel iterative algorithm for the solution of convex or non-convex optimization problems is presen...