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
summary:Axisymmetric thin elastic shells of constant thickness are considered and the meridian curve...
summary:The optimal control problem of variational inequality with applications to axisymmetric shel...
summary:Using the new variational approach for solving one elliptic equation of second order with co...
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:An axisymmetric second order elliptic problem with mixed boundarz conditions is considered. ...
summary:The shape of the meridian curve of an elastic body is optimized within a class of Lipschitz ...
summary:A model second order elliptic equation in cylindrical coordinates with mixed boundary condit...
summary:An optimal part of the boundary of a plane domain for the Poisson equation with mixed bounda...
summary:A minimization of a cost functional with respect to a part of a boundary is considered for a...
summary:A second order elliptic problem with axisymmetric data is solved in a finite element space, ...
AbstractLet L≔−r−2(r∂r)2−∂z2. We consider the equation Lu=f on a bounded polygonal domain with suita...
summary:Shape optimization problems are optimal design problems in which the shape of the boundary p...
summary:An elastic simply supported axisymmetric plate of given volume, fixed on an elastic foundati...
summary:Axisymmetric thin elastic shells of constant thickness are considered and the meridian curve...
summary:The optimal control problem of variational inequality with applications to axisymmetric shel...
summary:Using the new variational approach for solving one elliptic equation of second order with co...
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:An axisymmetric second order elliptic problem with mixed boundarz conditions is considered. ...
summary:The shape of the meridian curve of an elastic body is optimized within a class of Lipschitz ...
summary:A model second order elliptic equation in cylindrical coordinates with mixed boundary condit...
summary:An optimal part of the boundary of a plane domain for the Poisson equation with mixed bounda...
summary:A minimization of a cost functional with respect to a part of a boundary is considered for a...
summary:A second order elliptic problem with axisymmetric data is solved in a finite element space, ...
AbstractLet L≔−r−2(r∂r)2−∂z2. We consider the equation Lu=f on a bounded polygonal domain with suita...
summary:Shape optimization problems are optimal design problems in which the shape of the boundary p...
summary:An elastic simply supported axisymmetric plate of given volume, fixed on an elastic foundati...
summary:Axisymmetric thin elastic shells of constant thickness are considered and the meridian curve...
summary:The optimal control problem of variational inequality with applications to axisymmetric shel...
summary:Using the new variational approach for solving one elliptic equation of second order with co...