Time-dependent partial differential equations (PDEs) play an important role in applied mathematics and many other areas of science. One-shot methods try to compute the solution to these problems in a single iteration that solves for all time-steps at the same time. In this paper, we look at one-shot approaches for the optimal control of time-dependent PDEs and focus on the fast solution of these problems. The use of Krylov subspace solvers together with an efficient preconditioner allows for minimal storage requirements. We solve only approximate time-evolutions for both forward and adjoint problem and compute accurate solutions of a given control problem only at convergence of the overall Krylov subspace iteration. We show that our approac...
In this article, we motivate, derive and test �effective preconditioners to be used with the Minres ...
Standard Krylov subspace solvers for self-adjoint problems have rigorous convergence bounds based so...
We present a multigrid method of the second kind to optimize time-periodic, parabolic, partial diff...
Time-dependent partial differential equations (PDEs) play an important role in applied mathematics a...
Time-dependent partial differential equations (PDEs) play an important role in applied mathematics a...
Abstract. Time-dependent partial differential equations (PDEs) play an important role in applied mat...
Optimal control problems governed by time-dependent partial differential equations (PDEs) lead to la...
The optimization of functions subject to partial differential equations (PDE) plays an important rol...
We use COMSOL Multiphysics to solve time-dependent optimal control problems for partial differential...
The accurate and efficient solution of time-dependent PDE-constrained optimization problems is a cha...
In this thesis, we examine the solution to a range of time-dependent Partial Differential Equation (...
Optimization problems with constraints which require the solution of a partial differential equation...
The single-step one-shot method has proven to be very efficient for PDE-constrained optimization whe...
Interior point methods provide an attractive class of approaches for solving linear, quadratic and n...
The optimization of functions subject to partial differential equations (PDE) plays an important rol...
In this article, we motivate, derive and test �effective preconditioners to be used with the Minres ...
Standard Krylov subspace solvers for self-adjoint problems have rigorous convergence bounds based so...
We present a multigrid method of the second kind to optimize time-periodic, parabolic, partial diff...
Time-dependent partial differential equations (PDEs) play an important role in applied mathematics a...
Time-dependent partial differential equations (PDEs) play an important role in applied mathematics a...
Abstract. Time-dependent partial differential equations (PDEs) play an important role in applied mat...
Optimal control problems governed by time-dependent partial differential equations (PDEs) lead to la...
The optimization of functions subject to partial differential equations (PDE) plays an important rol...
We use COMSOL Multiphysics to solve time-dependent optimal control problems for partial differential...
The accurate and efficient solution of time-dependent PDE-constrained optimization problems is a cha...
In this thesis, we examine the solution to a range of time-dependent Partial Differential Equation (...
Optimization problems with constraints which require the solution of a partial differential equation...
The single-step one-shot method has proven to be very efficient for PDE-constrained optimization whe...
Interior point methods provide an attractive class of approaches for solving linear, quadratic and n...
The optimization of functions subject to partial differential equations (PDE) plays an important rol...
In this article, we motivate, derive and test �effective preconditioners to be used with the Minres ...
Standard Krylov subspace solvers for self-adjoint problems have rigorous convergence bounds based so...
We present a multigrid method of the second kind to optimize time-periodic, parabolic, partial diff...