The convergence of central paths has been a focal point of research on interior point methods. Quite detailed analyses have been made for the linear case. However, when it comes to the convex case, even if the constraints remain linear, the problem is unsettled. In [Math. Program., 103 (2005), pp. 63–94], Gilbert, Gonzaga, and Karas presented some examples in convex optimization, where the central path fails to converge. In this paper, we aim at finding some continuous trajectories which can converge for all linearly constrained convex optimization problems under some mild assumptions. We design and analyze a class of continuous trajectories, which are the solutions of certain ordinary differential equation (ODE) systems for solving linearl...
This thesis consists of four independent papers concerningdifferent aspects of interior methods for ...
We focus on convex semi-infinite programs with an infinite number of quadratically parametrized cons...
We study the local convergence of a primal-dual interior point method for nonlinear programming. A l...
In this paper, we analyse three interior point continuous trajectories for convex programming with g...
summary:In this work, we study the properties of central paths, defined with respect to a large clas...
This paper gives several equivalent conditions which guarantee the existence of the weighted central...
Besides the simplex algorithm, linear programs can also be solved via interior point methods. The th...
AbstractWe introduce two interior point algorithms for minimizing a convex function subject to linea...
This note derives bounds on the length of the primal-dual affine scaling directions associated with ...
In this paper, the Iri-Imai algorithm for solving linear and convex quadratic programming is extende...
We present an algorithm for the constrained saddle point problem with a convex-concave function L an...
The notion of the central path plays an important role in the convergence analysis of interior-point...
International audienceWe focus on convex semi-infinite programs with an infinite number of quadratic...
International audienceTropical geometry has been recently used to obtain new complexity results in c...
This thesis consists of four independent papers concerningdifferent aspects of interior methods for ...
We focus on convex semi-infinite programs with an infinite number of quadratically parametrized cons...
We study the local convergence of a primal-dual interior point method for nonlinear programming. A l...
In this paper, we analyse three interior point continuous trajectories for convex programming with g...
summary:In this work, we study the properties of central paths, defined with respect to a large clas...
This paper gives several equivalent conditions which guarantee the existence of the weighted central...
Besides the simplex algorithm, linear programs can also be solved via interior point methods. The th...
AbstractWe introduce two interior point algorithms for minimizing a convex function subject to linea...
This note derives bounds on the length of the primal-dual affine scaling directions associated with ...
In this paper, the Iri-Imai algorithm for solving linear and convex quadratic programming is extende...
We present an algorithm for the constrained saddle point problem with a convex-concave function L an...
The notion of the central path plays an important role in the convergence analysis of interior-point...
International audienceWe focus on convex semi-infinite programs with an infinite number of quadratic...
International audienceTropical geometry has been recently used to obtain new complexity results in c...
This thesis consists of four independent papers concerningdifferent aspects of interior methods for ...
We focus on convex semi-infinite programs with an infinite number of quadratically parametrized cons...
We study the local convergence of a primal-dual interior point method for nonlinear programming. A l...