We optimize a selection of eigenvalues of the Laplace operator with Dirichlet or Neumann boundary conditions by adjusting the shape of the domain on which the eigenvalue problem is considered. Here, a phase-field function is used to represent the shapes over which we minimize. The idea behind this method is to modify the Laplace operator by introducing phase-field dependent coefficients in order to extend the eigenvalue problem on a fixed design domain containing all admissible shapes. The resulting shape and topology optimization problem can then be formulated as an optimal control problem with PDE constraints in which the phase-field function acts as the control. For this optimal control problem, we establish first-order necessary optimal...
A phase-field based topology optimization approach is considered for the maximum stiffness or minimu...
In this paper we introduce a new formulation for shape optimization problems in fluids in a diffuse ...
We discuss a phase field method for shape optimization in the context of electromagnetic wave propag...
We optimize a selection of eigenvalues of the Laplace operator with Dirichlet or Neumann boundary co...
We optimize a selection of eigenvalues of the Laplace operator with Dirichlet or Neumann boundary co...
A cost function involving the eigenvalues of an elastic structure is optimized using a phase-field a...
This paper discusses a structural optimization method that optimizes shape and topology based on the...
We formulate a general shape and topology optimization problem in structural optimization by using a...
In this paper we introduce a new formulation for shape optimization problems in fluids in a diffuse ...
A phase field approach for structural topology optimization which allows for topology changes and mu...
The topology optimization problem is formulated in a phase-field approach. The solution procedure is...
Abstract in Undetermined A topology optimization method allowing for perimeter control is presented....
We formulate a general shape and topology optimization problem in structural optimization by using a...
A phase field approach for structural topology optimization which allows for topology chan...
A phase-field based topology optimization approach is considered for the maximum stiffness or minimu...
In this paper we introduce a new formulation for shape optimization problems in fluids in a diffuse ...
We discuss a phase field method for shape optimization in the context of electromagnetic wave propag...
We optimize a selection of eigenvalues of the Laplace operator with Dirichlet or Neumann boundary co...
We optimize a selection of eigenvalues of the Laplace operator with Dirichlet or Neumann boundary co...
A cost function involving the eigenvalues of an elastic structure is optimized using a phase-field a...
This paper discusses a structural optimization method that optimizes shape and topology based on the...
We formulate a general shape and topology optimization problem in structural optimization by using a...
In this paper we introduce a new formulation for shape optimization problems in fluids in a diffuse ...
A phase field approach for structural topology optimization which allows for topology changes and mu...
The topology optimization problem is formulated in a phase-field approach. The solution procedure is...
Abstract in Undetermined A topology optimization method allowing for perimeter control is presented....
We formulate a general shape and topology optimization problem in structural optimization by using a...
A phase field approach for structural topology optimization which allows for topology chan...
A phase-field based topology optimization approach is considered for the maximum stiffness or minimu...
In this paper we introduce a new formulation for shape optimization problems in fluids in a diffuse ...
We discuss a phase field method for shape optimization in the context of electromagnetic wave propag...