This work is concerned with the approximation and the numerical computation of polygonal minimal surfaces in R"q (q#>=#2). Polygonal minimal surfaces correspond to the critical points of Shiffman's function #THETA#. We present a finite element approximation of quasiminimal surfaces together with an error estimate. In this way we obtain discrete approximation #THETA#_h of #THETA# and fh of #nabla##THETA# . In particular we prove that the discrete functions converge uniformly on certain compact subsets. This will be the main tool for proving existence and convergence of discrete minimal surfaces in neighbourhoods of non-degenerate minimal surfaces. In the numerical part of this paper we compute numerical approximations of polygonal mi...
We study the finite element discretization of the abstract minimization problem min{F(u)}. The funct...
A method has been developed for binding numerically the minimal (soap-film) surface bounded a skew q...
textThe mathematical areas of minimal surfaces and homogenization of PDE have been subjects of rese...
Minimal surfaces bounded by a polygon #GAMMA# is contained in R"q(q#>=#2) correspond in a on...
We prove optimal convergence results for discrete approximations to (possibly unstable) minimal surf...
We solve the problem of finding and justifying an optimal fully discrete finite element procedure fo...
Abstract. We solve the problem of finding and justifying an optimal fully discrete finite element pr...
We solve the problem of finding and justifying an optimal fully discrete finite element procedure fo...
Based on generalizations of Shiffman's variational principle, we present a new method for the constr...
We present a new algorithm to compute stable discrete minimal surfaces bounded by a number of fixed ...
[59] leaves : ill. (some col.) ; 30 cm.PolyU Library Call No.: [THS] LG51 .H577M AMA 2000 WongIn thi...
The behaviour of a certain class of periodic minimal surfaces is studied. It becomes evident that si...
In this paper we prove the L² convergence rates for a fully discrete finite element procedure for a...
Towards identifying the number of minimal surfaces sharing the same boundary from the geometry of th...
We solve the problem of finding and justifying an optimal fully discrete finite-element procedure fo...
We study the finite element discretization of the abstract minimization problem min{F(u)}. The funct...
A method has been developed for binding numerically the minimal (soap-film) surface bounded a skew q...
textThe mathematical areas of minimal surfaces and homogenization of PDE have been subjects of rese...
Minimal surfaces bounded by a polygon #GAMMA# is contained in R"q(q#>=#2) correspond in a on...
We prove optimal convergence results for discrete approximations to (possibly unstable) minimal surf...
We solve the problem of finding and justifying an optimal fully discrete finite element procedure fo...
Abstract. We solve the problem of finding and justifying an optimal fully discrete finite element pr...
We solve the problem of finding and justifying an optimal fully discrete finite element procedure fo...
Based on generalizations of Shiffman's variational principle, we present a new method for the constr...
We present a new algorithm to compute stable discrete minimal surfaces bounded by a number of fixed ...
[59] leaves : ill. (some col.) ; 30 cm.PolyU Library Call No.: [THS] LG51 .H577M AMA 2000 WongIn thi...
The behaviour of a certain class of periodic minimal surfaces is studied. It becomes evident that si...
In this paper we prove the L² convergence rates for a fully discrete finite element procedure for a...
Towards identifying the number of minimal surfaces sharing the same boundary from the geometry of th...
We solve the problem of finding and justifying an optimal fully discrete finite-element procedure fo...
We study the finite element discretization of the abstract minimization problem min{F(u)}. The funct...
A method has been developed for binding numerically the minimal (soap-film) surface bounded a skew q...
textThe mathematical areas of minimal surfaces and homogenization of PDE have been subjects of rese...