Forward-backward methods are a very useful tool for the minimization of a functional given by the sum of a differentiable term and a nondifferentiable one, and their investigation has comprised several efforts from many researchers in the last decade. In this paper we focus on the convex case and, inspired by recent approaches for accelerating first-order iterative schemes, we develop a scaled inertial forward-backward algorithm which is based on a metric changing at each iteration and on a suitable extrapolation step. Unlike standard forward-backward methods with extrapolation, our scheme is able to handle functions whose domain is not the entire space. Both an O(1/k^2) convergence rate estimate on the objective function values and the con...
Abstract. In this paper we study an algorithm for solving a minimization problem composed of a diffe...
International audienceIn a Hilbert space, we analyze the convergence properties of a general class o...
In this paper we study an algorithm for solving a minimization problem composed of a differentiable ...
Forward-backward methods are a very useful tool for the minimization of a functional given by the su...
One of the most popular approaches for the minimization of a convex functional given by the sum of a...
We consider the minimization of a function G defined on RN, which is the sum of a (non necessarily c...
International audienceWe consider the minimization of a function $G$ defined on $R^N$, which is the ...
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...
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...
We present an iterative proximal inertial forward-backward method with memory effects, based on rece...
In view of the minimization of a function which is the sum of a differentiable function $f$ and a c...
International audienceIn a Hilbert space H, assuming (alpha(kappa)) a general sequence of nonnegativ...
We propose a Forward-Backward Truncated-Newton method (FBTN) for minimizing the sum of two convex fu...
Abstract. In this paper we study an algorithm for solving a minimization problem composed of a diffe...
International audienceIn a Hilbert space, we analyze the convergence properties of a general class o...
In this paper we study an algorithm for solving a minimization problem composed of a differentiable ...
Forward-backward methods are a very useful tool for the minimization of a functional given by the su...
One of the most popular approaches for the minimization of a convex functional given by the sum of a...
We consider the minimization of a function G defined on RN, which is the sum of a (non necessarily c...
International audienceWe consider the minimization of a function $G$ defined on $R^N$, which is the ...
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...
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...
We present an iterative proximal inertial forward-backward method with memory effects, based on rece...
In view of the minimization of a function which is the sum of a differentiable function $f$ and a c...
International audienceIn a Hilbert space H, assuming (alpha(kappa)) a general sequence of nonnegativ...
We propose a Forward-Backward Truncated-Newton method (FBTN) for minimizing the sum of two convex fu...
Abstract. In this paper we study an algorithm for solving a minimization problem composed of a diffe...
International audienceIn a Hilbert space, we analyze the convergence properties of a general class o...
In this paper we study an algorithm for solving a minimization problem composed of a differentiable ...