Add to ORKGFor linear programming, a primal-dual interior-point algorithm was recently constructed by Zhang and Tapia that achieves both polynomial complexity and Q-superlinear convergence (Q-quadratic in the nondegenerate case). In this paper, we extend their results to quadratic programming and linear complementarity problems
In this paper, we extend the Q-superlinear convergence theory recently developed by Zhang, Tapia and...
This paper presents the convergence proof and complexity analysis of an interior-point framework tha...
This work concerns primal-dual interior-point methods for semidefinite programming (SDP) that use a ...
The choice of the centering (or barrier) parameter and the step length parameter are the fundamental...
Linear Complementarity Problems (LCPs) belong to the class of -complete problems. Therefore we canno...
Linear Complementarity Problems (LCPs) belong to the class of -complete problems. Therefore we canno...
Linear Complementarity Problems (LCPs) belong to the class of -complete problems. Therefore we canno...
Linear Complementarity Problems (LCPs) belong to the class of -complete problems. Therefore we canno...
This note derives bounds on the length of the primal-dual affine scaling directions associated with ...
Linear Complementarity Problems (LCPs) belong to the class of -complete problems. Therefore we canno...
Linear Complementarity Problems (LCPs) belong to the class of -complete problems. Therefore we canno...
We describe an interior-point algorithm for monotone linear complementarity problems in which primal...
Kojima, Shindoh and Hara proposed a family of search directions for the semidefinite linear compleme...
The modern era of interior-point methods dates to 1984, when Karmarkar proposed his algorithm for li...
. We present an infeasible-interior-point algorithm for monotone linear complementarity problems in ...
In this paper, we extend the Q-superlinear convergence theory recently developed by Zhang, Tapia and...
This paper presents the convergence proof and complexity analysis of an interior-point framework tha...
This work concerns primal-dual interior-point methods for semidefinite programming (SDP) that use a ...
The choice of the centering (or barrier) parameter and the step length parameter are the fundamental...
Linear Complementarity Problems (LCPs) belong to the class of -complete problems. Therefore we canno...
Linear Complementarity Problems (LCPs) belong to the class of -complete problems. Therefore we canno...
Linear Complementarity Problems (LCPs) belong to the class of -complete problems. Therefore we canno...
Linear Complementarity Problems (LCPs) belong to the class of -complete problems. Therefore we canno...
This note derives bounds on the length of the primal-dual affine scaling directions associated with ...
Linear Complementarity Problems (LCPs) belong to the class of -complete problems. Therefore we canno...
Linear Complementarity Problems (LCPs) belong to the class of -complete problems. Therefore we canno...
We describe an interior-point algorithm for monotone linear complementarity problems in which primal...
Kojima, Shindoh and Hara proposed a family of search directions for the semidefinite linear compleme...
The modern era of interior-point methods dates to 1984, when Karmarkar proposed his algorithm for li...
. We present an infeasible-interior-point algorithm for monotone linear complementarity problems in ...
In this paper, we extend the Q-superlinear convergence theory recently developed by Zhang, Tapia and...
This paper presents the convergence proof and complexity analysis of an interior-point framework tha...
This work concerns primal-dual interior-point methods for semidefinite programming (SDP) that use a ...