The primal-dual gap is a natural upper bound for the energy error and, for uniformly convex minimization problems, also for the error in the energy norm. This feature can be used to construct reliable primal-dual gap error estimators for which the constant in the reliability estimate equals one for the energy error and equals the uniform convexity constant for the error in the energy norm. In particular, it defines a reliable upper bound for any functions that are feasible for the primal and the associated dual problem. The abstract a posteriori error estimate based on the primal-dual gap is provided in this article, and the abstract theory is applied to the nonlinear Laplace problem and the Rudin–Osher–Fatemi image denoising problem. The d...
In this paper a new technique for a posteriori error control and adaptive mesh design is presented f...
For a nonconforming finite element approximation of an elliptic model problem, we propose a posterio...
General strategies are discussed to derive a posteriori error estimates for conforming, mixed, and n...
The primal-dual gap is a natural upper bound for the energy error and, for uniformly convex minimiza...
We consider nonsmooth partial differential equations associated to a minimization of an energy funct...
We introduce a model-based excessive gap technique to analyze first-order primal-dual methods for co...
We present a primal-dual algorithmic framework to obtain approximate solutions to a prototypical con...
We present a primal-dual algorithmic framework to obtain approximate solutions to a prototypical con...
We present a primal-dual algorithmic framework to obtain approximate solutions to a prototypical con...
We study the linear convergence of the primal-dual hybrid gradient method. After a review of current...
Based on the Fenchel duality we build a primal-dual framework for minimizing a general functional co...
This thesis introduce two algorithms to remove the noise and blur from the image. In the First secti...
In this paper we introduce a new primal-dual technique for convergence analysis of gradient schemes ...
Abstract. We investigate the First-Order Primal-Dual (FPD) algorithm of Chambolle and Pock [1] in co...
This paper introduces a new computational methodology for determining a-posteriori multi-objective e...
In this paper a new technique for a posteriori error control and adaptive mesh design is presented f...
For a nonconforming finite element approximation of an elliptic model problem, we propose a posterio...
General strategies are discussed to derive a posteriori error estimates for conforming, mixed, and n...
The primal-dual gap is a natural upper bound for the energy error and, for uniformly convex minimiza...
We consider nonsmooth partial differential equations associated to a minimization of an energy funct...
We introduce a model-based excessive gap technique to analyze first-order primal-dual methods for co...
We present a primal-dual algorithmic framework to obtain approximate solutions to a prototypical con...
We present a primal-dual algorithmic framework to obtain approximate solutions to a prototypical con...
We present a primal-dual algorithmic framework to obtain approximate solutions to a prototypical con...
We study the linear convergence of the primal-dual hybrid gradient method. After a review of current...
Based on the Fenchel duality we build a primal-dual framework for minimizing a general functional co...
This thesis introduce two algorithms to remove the noise and blur from the image. In the First secti...
In this paper we introduce a new primal-dual technique for convergence analysis of gradient schemes ...
Abstract. We investigate the First-Order Primal-Dual (FPD) algorithm of Chambolle and Pock [1] in co...
This paper introduces a new computational methodology for determining a-posteriori multi-objective e...
In this paper a new technique for a posteriori error control and adaptive mesh design is presented f...
For a nonconforming finite element approximation of an elliptic model problem, we propose a posterio...
General strategies are discussed to derive a posteriori error estimates for conforming, mixed, and n...