In this article, we apply the theory of meshfree methods to the problem of PDE constrained optimization. We derive new collocation-type methods to solve the distributed control problem with Dirichlet boundary conditions and the Neumann boundary control problem, both involving Poisson's equation. We prove results concerning invertibility of the matrix systems we generate, and discuss a modication to guarantee invertibility. We implement these methods using MATLAB, and produce numerical results to demonstrate the methods' capability. We also comment on the methods' effectiveness in comparison to the widely-used finite element formulation of the problem, and make some recommendations as to how this work may be extended
We present a new reduced basis approach for the efficient and reliable solution of parametrized PDE-...
In this dissertation we propose and examine numerical methods for solving the boundary value problem...
© 2019 Elsevier Ltd In this paper, two meshless schemes are proposed for solving Dirichlet boundary ...
In this article, we apply the theory of meshfree methods to the problem of PDE-constrained optimizat...
In this article, we apply the theory of meshfree methods to the problem of PDE constrained optimizat...
Parameter optimization problems constrained by partial differential equations (PDEs) appear in many ...
Optimization problems with constraints which require the solution of a partial differential equation...
In this thesis, we develop preconditioned iterative methods for the solution of matrix systems arisi...
Optimization problems with constraints which require the solution of a partial differential equation...
Optimization problems with constraints which require the solution of a partial differential equatio...
AbstractDuring the last decade, three main variations have been proposed for solving elliptic PDEs b...
AbstractThis paper introduces radial basis functions (RBF) into the collocation methods and the comb...
In this article, we motivate, derive, and test effective preconditioners to be used with the MINRES ...
In this article, we motivate, derive and test effective preconditioners to be used with the Minres a...
We consider adaptive meshless discretisation of the Dirichlet problem for Poisson equation based on ...
We present a new reduced basis approach for the efficient and reliable solution of parametrized PDE-...
In this dissertation we propose and examine numerical methods for solving the boundary value problem...
© 2019 Elsevier Ltd In this paper, two meshless schemes are proposed for solving Dirichlet boundary ...
In this article, we apply the theory of meshfree methods to the problem of PDE-constrained optimizat...
In this article, we apply the theory of meshfree methods to the problem of PDE constrained optimizat...
Parameter optimization problems constrained by partial differential equations (PDEs) appear in many ...
Optimization problems with constraints which require the solution of a partial differential equation...
In this thesis, we develop preconditioned iterative methods for the solution of matrix systems arisi...
Optimization problems with constraints which require the solution of a partial differential equation...
Optimization problems with constraints which require the solution of a partial differential equatio...
AbstractDuring the last decade, three main variations have been proposed for solving elliptic PDEs b...
AbstractThis paper introduces radial basis functions (RBF) into the collocation methods and the comb...
In this article, we motivate, derive, and test effective preconditioners to be used with the MINRES ...
In this article, we motivate, derive and test effective preconditioners to be used with the Minres a...
We consider adaptive meshless discretisation of the Dirichlet problem for Poisson equation based on ...
We present a new reduced basis approach for the efficient and reliable solution of parametrized PDE-...
In this dissertation we propose and examine numerical methods for solving the boundary value problem...
© 2019 Elsevier Ltd In this paper, two meshless schemes are proposed for solving Dirichlet boundary ...