The KKT systems arising in nonlinearly constrained optimization problems may not have correct inertia, and therefore must be modified to avoid convergence to nonoptimal KKT points. Matrix factorizations can determine the inertia of a general symmetric matrix but are too costly in the PDE contextIn PDE-constrained optimization, KKT systems are generally solved with preconditioned iterative methods that are unable to detect whether the current matrix has correct inertia. Moreover, the preconditioners assume the existence of a preconditioner for the underlying PDE. Methods are discussed that solve the constrained problem by minimizing a sequence of smooth primal-dual merit functions. The Newton equations are solved approximately with a variant...
Saddle point systems arise widely in optimization problems with constraints. The utility of Schur co...
Optimal control problems with partial differential equations play an important role in many applicat...
Saddle point systems arise widely in optimization problems with constraints. The utility of Schur co...
We propose an inertia revealing preconditioning approach for the solution of nonconvex PDE-constrain...
PDE-constrained optimization is a frontier problem in computational science and engineering. All PDE...
In barrier methods for constrained optimization, the main work lies in solv-ing large linear systems...
We define a new Newton-type method for the solution of constrained systems of equations and analyze ...
Optimal control problems with partial differential equations play an important role in many applicat...
We present an iterative solver, called right transforming iterations (or right transformations), for...
We investigate the use of a preconditioning technique for solving linear systems of saddle point typ...
International audienceWe present a primal-dual algorithm for solving a constrained optimizationprobl...
This book introduces, in an accessible way, the basic elements of Numerical PDE-Constrained Optimiza...
Iterative solvers appear to be very promising in the development of efficient software, based on Int...
none3siPDE-constrained optimization aims at finding optimal setups for partial differential equation...
Optimization problems constrained by partial differential equations (PDEs) arise in a variety of fie...
Saddle point systems arise widely in optimization problems with constraints. The utility of Schur co...
Optimal control problems with partial differential equations play an important role in many applicat...
Saddle point systems arise widely in optimization problems with constraints. The utility of Schur co...
We propose an inertia revealing preconditioning approach for the solution of nonconvex PDE-constrain...
PDE-constrained optimization is a frontier problem in computational science and engineering. All PDE...
In barrier methods for constrained optimization, the main work lies in solv-ing large linear systems...
We define a new Newton-type method for the solution of constrained systems of equations and analyze ...
Optimal control problems with partial differential equations play an important role in many applicat...
We present an iterative solver, called right transforming iterations (or right transformations), for...
We investigate the use of a preconditioning technique for solving linear systems of saddle point typ...
International audienceWe present a primal-dual algorithm for solving a constrained optimizationprobl...
This book introduces, in an accessible way, the basic elements of Numerical PDE-Constrained Optimiza...
Iterative solvers appear to be very promising in the development of efficient software, based on Int...
none3siPDE-constrained optimization aims at finding optimal setups for partial differential equation...
Optimization problems constrained by partial differential equations (PDEs) arise in a variety of fie...
Saddle point systems arise widely in optimization problems with constraints. The utility of Schur co...
Optimal control problems with partial differential equations play an important role in many applicat...
Saddle point systems arise widely in optimization problems with constraints. The utility of Schur co...