summary:An axisymmetric second order elliptic problem with mixed boundary conditions is considered. A part of the boundary has to be found so as to minimize one of four types of cost functionals. The existence of an optimal boundary is proven and a convergence analysis for piecewise linear approximate solutions presented, using weighted Sobolev spaces
Fixed domain methods have well-known advantages in the solution of variable domain problems includin...
For optimization problems of domains in which elliptic boundary value problems are defined a solutio...
We propose and examine the primal and dual finite element method for solving an axially symmetric el...
summary:An axisymmetric second order elliptic problem with mixed boundarz conditions is considered. ...
summary:An axisymmetric second order elliptic problem with mixed boundary conditions is considered. ...
summary:An axisymmetric second order elliptic problem with mixed boundary conditions is considered. ...
summary:The shape of the meridian curve of an elastic body is optimized within a class of Lipschitz ...
summary:An optimal part of the boundary of a plane domain for the Poisson equation with mixed bounda...
Shape optimization problems of linear elastic continua, flow fields, magnetic fields, etc. under equ...
summary:A model second order elliptic equation in cylindrical coordinates with mixed boundary condit...
A numerical analysis technique is presented for solving optimization prob-lems of geometrical domain...
We present a numerical analysis and results using the traction method for optimizing do-mains in ter...
We present a numerical analysis and results using the traction method for optimizing domains in term...
summary:A second order elliptic problem with axisymmetric data is solved in a finite element space, ...
Abstract. This paper is the first in a series devoted to the analysis of the regularity of the solut...
Fixed domain methods have well-known advantages in the solution of variable domain problems includin...
For optimization problems of domains in which elliptic boundary value problems are defined a solutio...
We propose and examine the primal and dual finite element method for solving an axially symmetric el...
summary:An axisymmetric second order elliptic problem with mixed boundarz conditions is considered. ...
summary:An axisymmetric second order elliptic problem with mixed boundary conditions is considered. ...
summary:An axisymmetric second order elliptic problem with mixed boundary conditions is considered. ...
summary:The shape of the meridian curve of an elastic body is optimized within a class of Lipschitz ...
summary:An optimal part of the boundary of a plane domain for the Poisson equation with mixed bounda...
Shape optimization problems of linear elastic continua, flow fields, magnetic fields, etc. under equ...
summary:A model second order elliptic equation in cylindrical coordinates with mixed boundary condit...
A numerical analysis technique is presented for solving optimization prob-lems of geometrical domain...
We present a numerical analysis and results using the traction method for optimizing do-mains in ter...
We present a numerical analysis and results using the traction method for optimizing domains in term...
summary:A second order elliptic problem with axisymmetric data is solved in a finite element space, ...
Abstract. This paper is the first in a series devoted to the analysis of the regularity of the solut...
Fixed domain methods have well-known advantages in the solution of variable domain problems includin...
For optimization problems of domains in which elliptic boundary value problems are defined a solutio...
We propose and examine the primal and dual finite element method for solving an axially symmetric el...