Over the last 25 years, interior-point methods (IPMs) have emerged as a viable class of algorithms for solving various forms of conic optimization problems. Most IPMs use a modified Newton method to determine the search direction at each iteration. The system of equations corresponding to the modified Newton system can often be reduced to the so-called normal equation, a system of equations whose matrix ADA' is positive definite, yet often ill-conditioned. In this thesis, we first investigate the theoretical properties of the maximum weight basis (MWB) preconditioner, and show that when applied to a matrix of the form ADA', where D is positive definite and diagonal, the MWB preconditioner yields a preconditioned matrix whose condition num...
5siIn this article, we address the efficient numerical solution of linear and quadratic programming ...
Primal &ndash dual interior &ndash point methods (IPMs) are distinguished for their exceptional theo...
138 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1988.The solution of a linear syst...
Over the last 25 years, interior-point methods (IPMs) have emerged as a viable class of algorithms f...
A new class of preconditioners for the iterative solution of the linear systems arising from interio...
AbstractA new class of preconditioners for the iterative solution of the linear systems arising from...
In this article we consider modified search directions in the endgame of interior point methods for...
In this paper, we address the efficient numerical solution ...
Solving normal equations AAᵀx = b, where A is an m x n matrix, is a common task in numerical optimiz...
This article presents improvements to the hybrid preconditioner previously developed for the solutio...
A new class of preconditioners for the iterative solution of the linear systems arising from interio...
In each iteration of the interior point method (IPM) at least one linear system has to be solved. T...
In this paper we present general-purpose preconditioners for regularized augmented systems, and thei...
In this work we devise efficient algorithms for finding the search directions for interior point met...
Most interior-point methods (IPMs) use a modified Newton method to determine the search direction a...
5siIn this article, we address the efficient numerical solution of linear and quadratic programming ...
Primal &ndash dual interior &ndash point methods (IPMs) are distinguished for their exceptional theo...
138 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1988.The solution of a linear syst...
Over the last 25 years, interior-point methods (IPMs) have emerged as a viable class of algorithms f...
A new class of preconditioners for the iterative solution of the linear systems arising from interio...
AbstractA new class of preconditioners for the iterative solution of the linear systems arising from...
In this article we consider modified search directions in the endgame of interior point methods for...
In this paper, we address the efficient numerical solution ...
Solving normal equations AAᵀx = b, where A is an m x n matrix, is a common task in numerical optimiz...
This article presents improvements to the hybrid preconditioner previously developed for the solutio...
A new class of preconditioners for the iterative solution of the linear systems arising from interio...
In each iteration of the interior point method (IPM) at least one linear system has to be solved. T...
In this paper we present general-purpose preconditioners for regularized augmented systems, and thei...
In this work we devise efficient algorithms for finding the search directions for interior point met...
Most interior-point methods (IPMs) use a modified Newton method to determine the search direction a...
5siIn this article, we address the efficient numerical solution of linear and quadratic programming ...
Primal &ndash dual interior &ndash point methods (IPMs) are distinguished for their exceptional theo...
138 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1988.The solution of a linear syst...