Add to ORKGQuite often practical problems of optimal design have no solution. This situation can be alleviated by relaxation, where one needs generalised materials which can mathematically be defined by using the theory of homogenisation. First mathematical results in this direction for general (nonperiodic) materials were obtained by Murat and Tartar. We present some results in optimal design where the equation of state is hyperbolic. The control function is related to the response of vibrating material under the given external force. As the problem under consideration has no solution, we consider its relaxation to H-closure of the original set of controls
We address the numerical approximation by finite-element methods of an optimal design problem for a ...
summary:A control of the system of nonlinear Kármán's equations for a thin elastic plate with clampe...
International audienceThis paper is concerned with the following optimal design problem:¯nd the dist...
Quite often practical problems of optimal design have no solution. This situation can be alleviated ...
We consider an optimal design problem with a hyperbolic initial boundary value problem as the state ...
We study an optimal design problem consisting in mixing two anisotropic (electric or thermal) materi...
AbstractIn a previous paper, we studied the homogenization of a sequence of parabolic linear Dirichl...
Abstract. We consider an optimal design problem with a hyperbolic initial boundary value problem as ...
We deal with an optimal control problem governed by a nonlinear boundary value problem in elastostat...
In this thesis, we study numerical solutions for optimal design problems. In such problems, the goal...
AbstractWe consider the heat equation in (0,T)×Ω, Ω⊂RN, N⩾1, and address the nonlinear optimal desig...
In this talk we shall discuss algorithms and CAD tools for the design and analysis of structures for...
An optimal design problem governed by the wave equation is examined in detail. Specifically, we see...
We consider the heat equation in (0, T) × Ω, Ω ⊂ RN, N ≥ 1, and address the nonlinear optimal desig...
AbstractControlling a one-dimensional hyperbolic equation at x = 0 is considered so as best to follo...
We address the numerical approximation by finite-element methods of an optimal design problem for a ...
summary:A control of the system of nonlinear Kármán's equations for a thin elastic plate with clampe...
International audienceThis paper is concerned with the following optimal design problem:¯nd the dist...
Quite often practical problems of optimal design have no solution. This situation can be alleviated ...
We consider an optimal design problem with a hyperbolic initial boundary value problem as the state ...
We study an optimal design problem consisting in mixing two anisotropic (electric or thermal) materi...
AbstractIn a previous paper, we studied the homogenization of a sequence of parabolic linear Dirichl...
Abstract. We consider an optimal design problem with a hyperbolic initial boundary value problem as ...
We deal with an optimal control problem governed by a nonlinear boundary value problem in elastostat...
In this thesis, we study numerical solutions for optimal design problems. In such problems, the goal...
AbstractWe consider the heat equation in (0,T)×Ω, Ω⊂RN, N⩾1, and address the nonlinear optimal desig...
In this talk we shall discuss algorithms and CAD tools for the design and analysis of structures for...
An optimal design problem governed by the wave equation is examined in detail. Specifically, we see...
We consider the heat equation in (0, T) × Ω, Ω ⊂ RN, N ≥ 1, and address the nonlinear optimal desig...
AbstractControlling a one-dimensional hyperbolic equation at x = 0 is considered so as best to follo...
We address the numerical approximation by finite-element methods of an optimal design problem for a ...
summary:A control of the system of nonlinear Kármán's equations for a thin elastic plate with clampe...
International audienceThis paper is concerned with the following optimal design problem:¯nd the dist...