One of the most efficient interior-point methods for some classes of block-angular structured problems solves the normal equations by a combination of Cholesky factorizations and preconditioned conjugate gradient for, respectively, the block and linking constraints. In this work we show that the choice of a good preconditioner depends on geometrical properties of the constraint structure. In particular, the principal angles between the subspaces generated by the diagonal blocks and the linking constraints can be used to estimate ex ante the efficiency of the preconditioner. Numerical validation is provided with some generated optimization problems. An application to the solution of multicommodity network flow problems with nodal capacities ...
Saddle point systems arise widely in optimization problems with constraints. The utility of Schur co...
A new class of preconditioners for the iterative solution of the linear systems arising from interio...
We consider symmetric saddle point matrices. We analyze block preconditioners based on the knowledge...
J. Castro, S. Nasini, On geometrical properties of preconditioners in IPMs for classes of block-angu...
The computational time required by interior-point methods is often domi- nated by the solution of li...
Constraints matrices with block-angular structures are pervasive in Optimization. Interior-point met...
One of the best approaches for some classes of multicommodity flow problems is a specialized interio...
The finite element (FE) integration of the coupled consolidation equations requires the solution of ...
We consider the numerical solution of saddle point systems of equations resulting from the discretiz...
Saddle point problems arise frequently in many applications in science and engineering, including co...
In this paper we investigate the possibility of using a block triangular preconditioner for saddle p...
Block constraint preconditioners are a most recent development for the iterative solution to large-s...
Saddle point systems arise widely in optimization problems with constraints. The utility of Schur co...
We examine block-diagonal preconditioners and efficient variants of indefinite preconditioners for b...
One of the most efficient interior-point methods for some classes of primal block-angular problems s...
Saddle point systems arise widely in optimization problems with constraints. The utility of Schur co...
A new class of preconditioners for the iterative solution of the linear systems arising from interio...
We consider symmetric saddle point matrices. We analyze block preconditioners based on the knowledge...
J. Castro, S. Nasini, On geometrical properties of preconditioners in IPMs for classes of block-angu...
The computational time required by interior-point methods is often domi- nated by the solution of li...
Constraints matrices with block-angular structures are pervasive in Optimization. Interior-point met...
One of the best approaches for some classes of multicommodity flow problems is a specialized interio...
The finite element (FE) integration of the coupled consolidation equations requires the solution of ...
We consider the numerical solution of saddle point systems of equations resulting from the discretiz...
Saddle point problems arise frequently in many applications in science and engineering, including co...
In this paper we investigate the possibility of using a block triangular preconditioner for saddle p...
Block constraint preconditioners are a most recent development for the iterative solution to large-s...
Saddle point systems arise widely in optimization problems with constraints. The utility of Schur co...
We examine block-diagonal preconditioners and efficient variants of indefinite preconditioners for b...
One of the most efficient interior-point methods for some classes of primal block-angular problems s...
Saddle point systems arise widely in optimization problems with constraints. The utility of Schur co...
A new class of preconditioners for the iterative solution of the linear systems arising from interio...
We consider symmetric saddle point matrices. We analyze block preconditioners based on the knowledge...