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MOR
2000
2000
Superlinear Convergence of an Interior-Point Method Despite Dependent Constraints
We show that an interior-pointmethodfor monotonevariationalinequalitiesexhibits superlinear convergence provided that all the standard assumptions hold except for the well-known assumption that the Jacobian of the active constraints has full rank at the solution. We show that superlinear convergence occurs even when the constant-rank condition on the Jacobian assumed in an earlier work does not hold. AMSMOS subject classi cations. 90C33, 90C30, 49M45
Real-time TrafficConvergence | Interior-pointmethodfor Monotonevariationalinequalitiesexhibits | MOR 2000 | Well-known Assumption |
| Added | 19 Dec 2010 |
| Updated | 19 Dec 2010 |
| Type | Journal |
| Year | 2000 |
| Where | MOR |
| Authors | Daniel Ralph, Stephen J. Wright |
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