Abstract. We solve the problem of finding and justifying an optimal fully discrete finite element procedure for approximating minimal, including unstable, surfaces. In a previous paper we introduced the general framework and some preliminary estimates, developed the algorithm and give the numerical results. In this paper we prove the convergence estimate. 1
We study the Plateau problem with a lower-dimensional obstacle in R-n. Intuitively, in R-3 this corr...
We present a finite element discretization scheme for the compressible and incompressible elasticity...
The proof of optimal convergence rates of adaptive finite element methods relies on Stevenson's conc...
We solve the problem of finding and justifying an optimal fully discrete finite element procedure fo...
We solve the problem of finding and justifying an optimal fully discrete finite element procedure fo...
In this paper we prove the L² convergence rates for a fully discrete finite element procedure for a...
We solve the problem of finding and justifying an optimal fully discrete finite-element procedure fo...
We prove optimal convergence results for discrete approximations to (possibly unstable) minimal surf...
This work is concerned with the approximation and the numerical computation of polygonal minimal sur...
Towards identifying the number of minimal surfaces sharing the same boundary from the geometry of th...
We propose and analyze a fully discrete finite element scheme for the phase field model describing t...
Résoudre le Problème de Plateau signifie trouver la surface ayant l’aire minimale parmi toutes les s...
AbstractThis paper provides a sufficient condition for the discrete maximum principle for a fully di...
Solving the Plateau problem means to find the surface with minimal area among all surfaces with a gi...
In this paper we propose a cutting method to solve a conditional minimization problem of a discrete ...
We study the Plateau problem with a lower-dimensional obstacle in R-n. Intuitively, in R-3 this corr...
We present a finite element discretization scheme for the compressible and incompressible elasticity...
The proof of optimal convergence rates of adaptive finite element methods relies on Stevenson's conc...
We solve the problem of finding and justifying an optimal fully discrete finite element procedure fo...
We solve the problem of finding and justifying an optimal fully discrete finite element procedure fo...
In this paper we prove the L² convergence rates for a fully discrete finite element procedure for a...
We solve the problem of finding and justifying an optimal fully discrete finite-element procedure fo...
We prove optimal convergence results for discrete approximations to (possibly unstable) minimal surf...
This work is concerned with the approximation and the numerical computation of polygonal minimal sur...
Towards identifying the number of minimal surfaces sharing the same boundary from the geometry of th...
We propose and analyze a fully discrete finite element scheme for the phase field model describing t...
Résoudre le Problème de Plateau signifie trouver la surface ayant l’aire minimale parmi toutes les s...
AbstractThis paper provides a sufficient condition for the discrete maximum principle for a fully di...
Solving the Plateau problem means to find the surface with minimal area among all surfaces with a gi...
In this paper we propose a cutting method to solve a conditional minimization problem of a discrete ...
We study the Plateau problem with a lower-dimensional obstacle in R-n. Intuitively, in R-3 this corr...
We present a finite element discretization scheme for the compressible and incompressible elasticity...
The proof of optimal convergence rates of adaptive finite element methods relies on Stevenson's conc...