In this paper we consider a homogeneous analytic center cutting plane method in a projective space. We describe a general scheme that uses a homogeneous oracle and computes an approximate analytic center at each iteration. This technique is applied to a convex feasibility problem, to variational inequalities, and convex constrained minimization. We prove that these problems can be solved with the same order of complexity as in the case of exact analytic centers. For the feasibility and the minimization problems rough approximations suffice, but very high precision is required for the variational inequalities. We give an exemple of variational inequality where even the first analytic center needs to be computed with a precision matching the ...
This paper analyzes the introduction of multiple central cuts in a conic formulation of the analytic...
150 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1992.We present four algorithms th...
We present a survey of nondifferentiable optimization problems and methods with special focus on the...
In this paper we consider a homogeneous analytic center cutting plane method in a projective space. ...
In this paper we consider a new analytic center cutting plane method in a projective space.We prove ...
In this paper we consider a new analytic center cutting plane method in an extended space. We prove ...
Abstract An analytic center cutting plane method is an iterative algorithm based on the computation ...
This thesis concerns the solution of variational inequalities (VIs) with analytic center cutting pla...
Interior-point methods have not only shown their efficiency for linear and some nonlinear programmin...
The analytic center cutting plane (ACCPM) methods aims to solve nondifferentiable convex problems. T...
We analyze the complexity of the analytic center cutting plane or column generation algorithm for so...
We present an algorithm for variational inequalities V I(F; Y) that uses a primal-dual version of th...
. The paper considers two cases of variational inequality problems. The first case involves an affin...
La méthode homogène des centres analytiques est une méthode de plans coupants pour l'optimisation co...
We present a variant of the analytic center cutting plane algorithm proposed by Goffin et al. (1996)...
This paper analyzes the introduction of multiple central cuts in a conic formulation of the analytic...
150 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1992.We present four algorithms th...
We present a survey of nondifferentiable optimization problems and methods with special focus on the...
In this paper we consider a homogeneous analytic center cutting plane method in a projective space. ...
In this paper we consider a new analytic center cutting plane method in a projective space.We prove ...
In this paper we consider a new analytic center cutting plane method in an extended space. We prove ...
Abstract An analytic center cutting plane method is an iterative algorithm based on the computation ...
This thesis concerns the solution of variational inequalities (VIs) with analytic center cutting pla...
Interior-point methods have not only shown their efficiency for linear and some nonlinear programmin...
The analytic center cutting plane (ACCPM) methods aims to solve nondifferentiable convex problems. T...
We analyze the complexity of the analytic center cutting plane or column generation algorithm for so...
We present an algorithm for variational inequalities V I(F; Y) that uses a primal-dual version of th...
. The paper considers two cases of variational inequality problems. The first case involves an affin...
La méthode homogène des centres analytiques est une méthode de plans coupants pour l'optimisation co...
We present a variant of the analytic center cutting plane algorithm proposed by Goffin et al. (1996)...
This paper analyzes the introduction of multiple central cuts in a conic formulation of the analytic...
150 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1992.We present four algorithms th...
We present a survey of nondifferentiable optimization problems and methods with special focus on the...