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Article
Optimal flows in networks with multiple sources and sinks
The concept of an optimal flow in a multiple source, multiple sink network is defined. It generalizes maximal flow in a single source, single sink network. An existence proof and an algorithm are given.
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Article
A monotone complementarity problem with feasible solutions but no complementary solutions
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Article
On monotonicity in parametric linear complementarity problems
This paper generalizes the answers that were given by R.W. Cottle to questions that were originally raised by G. Maier.
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Article
On the existence and uniqueness of solutions in nonlinear complementarity theory
A complementarity problem is said to be globally uniquely solvable (GUS) if it has a unique solution, and this property will not change, even if any constant term is added to the map** generating the problem.
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Chapter
On the parametric nonlinear complementarity problem
A parametrized version of the nonlinear complementarity problem is formulated. The existence of a continuation of a solution is investigated and sufficient and necessary conditions for the monotonicity of such...
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Article
On the expected number of linear complementarity cones intersected by random and semi-random rays
Lemke's algorithm for the linear complementarity problem follows a ray which leads from a certain fixed point (traditionally, the point (1,⋯, 1)T) to the point given in the problem. The problem also induces a set...
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Article
Improved asymptotic analysis of the average number of steps performed by the self-dual simplex algorithm
In this paper we analyze the average number of steps performed by the self-dual simplex algorithm for linear programming, under the probabilistic model of spherical symmetry. The model was proposed by Smale. C...
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Article
A note on degeneracy in linear programming
We show that the problem of exiting a degenerate vertex is as hard as the general linear programming problem. More precisely, every linear programming problem can easily be reduced to one where the second best...
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Article
An interior point potential reduction algorithm for the linear complementarity problem
The linear complementarity problem (LCP) can be viewed as the problem of minimizingx T y subject toy=Mx+q andx, y⩾0. We are interested in finding a point withx T y <ε for a givenε > 0. The algorithm proceeds by i...
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Article
Tight bounds and 2-approximation algorithms for integer programs with two variables per inequality
The problem of integer programming in bounded variables, over constraints with no more than two variables in each constraint is NP-complete, even when all variables are binary. This paper deals with integer li...
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Article
Theoretical convergence of large-step primal—dual interior point algorithms for linear programming
This paper proposes two sets of rules, Rule G and Rule P, for controlling step lengths in a generic primal—dual interior point method for solving the linear programming problem in standard form and its dual. T...
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Article
A primal—dual infeasible-interior-point algorithm for linear programming
As in many primal—dual interior-point algorithms, a primal—dual infeasible-interior-point algorithm chooses a new point along the Newton direction towards a point on the central trajectory, but it does not con...
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Article
New algorithms for generalized network flows
This paper, of which a preliminary version appeared in ISTCS'92, is concerned with generalized network flow problems. In a generalized network, each edgee = (u, v) has a positive ‘flow multiplier’a ...
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Article
A modified layered-step interior-point algorithm for linear programming
The layered-step interior-point algorithm was introduced by Vavasis and Ye. The algorithm accelerates the path following interior-point algorithm and its arithmetic complexity depends only on the coefficient m...