summary:A minimization of a cost functional with respect to a part of the boundary, where the body is fixed, is considered. The criterion is defined by an integral of a yield function. The principle of Haar-Kármán and piecewise constant stress approximations are used to solve the state problem. A convergence result and the existence of an optimal boundary is proved
summary:Existence of an optimal shape of a deformable body made from a physically nonlinear material...
summary:Existence of an optimal shape of a deformable body made from a physically nonlinear material...
summary:Shape optimization of a two-dimensional elastic body is considered, provided the material is...
summary:A minimization of a cost functional with respect to a part of the boundary, where the body i...
summary:A minimization of a cost functional with respect to a part of a boundary is considered for a...
summary:A minimization of a cost functional with respect to a part of a boundary is considered for a...
summary:A minimization of a cost functional with respect to a part of the boundary, where the body i...
summary:Within the range of Prandtl-Reuss model of elasto-plasticity the following optimal design pr...
summary:Within the range of Prandtl-Reuss model of elasto-plasticity the following optimal design pr...
summary:The state problem of elasto-plasticity (for the model with strain-hardening) is formulated i...
summary:The state problem of elasto-plasticity (for the model with strain-hardening) is formulated i...
summary:Within the range of Prandtl-Reuss model of elasto-plasticity the following optimal design pr...
summary:Using the Haar-Kármán principle, approximate solutions of the basic boundary value problems ...
summary:Using the Haar-Kármán principle, approximate solutions of the basic boundary value problems ...
summary:The state problem of elasto-plasticity (for the model with strain-hardening) is formulated i...
summary:Existence of an optimal shape of a deformable body made from a physically nonlinear material...
summary:Existence of an optimal shape of a deformable body made from a physically nonlinear material...
summary:Shape optimization of a two-dimensional elastic body is considered, provided the material is...
summary:A minimization of a cost functional with respect to a part of the boundary, where the body i...
summary:A minimization of a cost functional with respect to a part of a boundary is considered for a...
summary:A minimization of a cost functional with respect to a part of a boundary is considered for a...
summary:A minimization of a cost functional with respect to a part of the boundary, where the body i...
summary:Within the range of Prandtl-Reuss model of elasto-plasticity the following optimal design pr...
summary:Within the range of Prandtl-Reuss model of elasto-plasticity the following optimal design pr...
summary:The state problem of elasto-plasticity (for the model with strain-hardening) is formulated i...
summary:The state problem of elasto-plasticity (for the model with strain-hardening) is formulated i...
summary:Within the range of Prandtl-Reuss model of elasto-plasticity the following optimal design pr...
summary:Using the Haar-Kármán principle, approximate solutions of the basic boundary value problems ...
summary:Using the Haar-Kármán principle, approximate solutions of the basic boundary value problems ...
summary:The state problem of elasto-plasticity (for the model with strain-hardening) is formulated i...
summary:Existence of an optimal shape of a deformable body made from a physically nonlinear material...
summary:Existence of an optimal shape of a deformable body made from a physically nonlinear material...
summary:Shape optimization of a two-dimensional elastic body is considered, provided the material is...
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