This work is concerned with evolution equations and their forwardbackward discretizations, and aims at building bridges between differential equations and variational analysis. Our first contribution is an estimation for the distance between iterates of sequences generated by forward-backward schemes, useful in the convergence and robustness analysis of iterative algorithms of widespread use in numerical optimization and variational inequalities. Our second contribution is the approximation, on a bounded time frame, of the solutions of evolution equations governed by accretive (monotone) operators with an additive structure, by trajectories constructed by interpolating forward-backward sequences. This provides a short, simple and self-conta...
In infinite-dimensional Hilbert spaces we device a class of strongly convergent primal-dual schemes ...
Abstract An approximation theory for semilinear evolution equations is treated in terms of convergen...
International audienceIn this paper, we study the backward forward algorithm as a splitting method t...
This work is concerned with evolution equations and their forwardbackward discretizations, and aims ...
Tesis para optar al grado de Doctor en Ciencias de la Ingeniería, Mención Modelación MatemáticaThis ...
This article studies the solutions of time-dependent differential inclusions which is motivated by t...
In this dissertation we study time and space discretization methods for approximating solutions of a...
The paper deals with discretisation methods for nonlinear operator equations written as abstract non...
A general framework is presented to discuss the approximate solutions of an evolution equation in a...
AbstractWe study the Galerkin Euler approximations of semilinear evolution equations of parabolic ty...
This dissertation refines and further develops numerical methods for the inversion of the classical ...
International audienceThe aim of the present paper is to study the regularity properties of the solu...
AbstractThe study on discretization and convergence of BSDEs rapidly developed in recent years. We e...
Tseng’s forward-backward-forward algorithm is a valuable alternative for Korpelevich’s extragradient...
In infinite-dimensional Hilbert spaces we device a class of strongly convergent primal-dual schemes ...
Abstract An approximation theory for semilinear evolution equations is treated in terms of convergen...
International audienceIn this paper, we study the backward forward algorithm as a splitting method t...
This work is concerned with evolution equations and their forwardbackward discretizations, and aims ...
Tesis para optar al grado de Doctor en Ciencias de la Ingeniería, Mención Modelación MatemáticaThis ...
This article studies the solutions of time-dependent differential inclusions which is motivated by t...
In this dissertation we study time and space discretization methods for approximating solutions of a...
The paper deals with discretisation methods for nonlinear operator equations written as abstract non...
A general framework is presented to discuss the approximate solutions of an evolution equation in a...
AbstractWe study the Galerkin Euler approximations of semilinear evolution equations of parabolic ty...
This dissertation refines and further develops numerical methods for the inversion of the classical ...
International audienceThe aim of the present paper is to study the regularity properties of the solu...
AbstractThe study on discretization and convergence of BSDEs rapidly developed in recent years. We e...
Tseng’s forward-backward-forward algorithm is a valuable alternative for Korpelevich’s extragradient...
In infinite-dimensional Hilbert spaces we device a class of strongly convergent primal-dual schemes ...
Abstract An approximation theory for semilinear evolution equations is treated in terms of convergen...
International audienceIn this paper, we study the backward forward algorithm as a splitting method t...