Add to ORKGThe class of sufficient matrices is important in the study of the linear complementarity problem (LCP)—some interior point methods (IPM’s) for LCP’s with sufficient data matrices have complexity polynomial in the bit size of the matrix and its handicap.In this paper we show that the handicap of a sufficient matrix may be exponential in its bit size, implying that the known complexity bounds of interior point methods are not polynomial in the input size of the LCP problem. We also introduce a semidefinite programming based heuristic, that provides a finite upper bond on the handicap, for the sub-class of Ρ-matrices (where all principal minors are positive)
In this paper, a weighted-path-following interior point algorithm for P∗(κ)-linear complem...
This paper establishes the polynomial convergence of a new class of path-following methods for linea...
In this paper, we first present a brief infeasible interior-point method with full-Newton step for s...
Linear Complementarity Problems (LCPs) belong to the class of NP-complete problems. Therefore we can...
Linear Complementarity Problems (LCP s) belong to the class of NP-complete problems. Therefore we ca...
Linear Complementarity Problems (LCPs) belong to the class of NP-complete problems. Therefore we can...
AbstractIn this paper we propose a new large-update primal–dual interior point algorithm for P∗(κ) l...
AbstractAny linear complementarity problem with a sufficient matrix can be solved by means of the un...
Linear Complementarity Problems (LCPs) belong to the class of -complete problems. Therefore we canno...
ABSTRACT. In this paper we extend primal-dual interior point algorithm for linear optimiza-tion (LO)...
In this paper we study sufficient matrices, which play an important role in theoretical analysis of ...
AbstractIn this paper we propose a new large-update primal-dual interior point algorithm for P*(κ) l...
Linear Complementarity Problems (LCPs) belong to the class of NP-complete problems. Therefore we can...
A class of Linear Complementarity Problems (LCP) is an important class of problems closely related t...
A large-step infeasible path-following method is proposed for solving general linear complementarity...
In this paper, a weighted-path-following interior point algorithm for P∗(κ)-linear complem...
This paper establishes the polynomial convergence of a new class of path-following methods for linea...
In this paper, we first present a brief infeasible interior-point method with full-Newton step for s...
Linear Complementarity Problems (LCPs) belong to the class of NP-complete problems. Therefore we can...
Linear Complementarity Problems (LCP s) belong to the class of NP-complete problems. Therefore we ca...
Linear Complementarity Problems (LCPs) belong to the class of NP-complete problems. Therefore we can...
AbstractIn this paper we propose a new large-update primal–dual interior point algorithm for P∗(κ) l...
AbstractAny linear complementarity problem with a sufficient matrix can be solved by means of the un...
Linear Complementarity Problems (LCPs) belong to the class of -complete problems. Therefore we canno...
ABSTRACT. In this paper we extend primal-dual interior point algorithm for linear optimiza-tion (LO)...
In this paper we study sufficient matrices, which play an important role in theoretical analysis of ...
AbstractIn this paper we propose a new large-update primal-dual interior point algorithm for P*(κ) l...
Linear Complementarity Problems (LCPs) belong to the class of NP-complete problems. Therefore we can...
A class of Linear Complementarity Problems (LCP) is an important class of problems closely related t...
A large-step infeasible path-following method is proposed for solving general linear complementarity...
In this paper, a weighted-path-following interior point algorithm for P∗(κ)-linear complem...
This paper establishes the polynomial convergence of a new class of path-following methods for linea...
In this paper, we first present a brief infeasible interior-point method with full-Newton step for s...