Abstract
In this paper, the filter technique of Fletcher and Leyffer (1997) is used to globalize the primal-dual interior-point algorithm for nonlinear programming, avoiding the use of merit functions and the updating of penalty parameters. The new algorithm decomposes the primal-dual step obtained from the perturbed first-order necessary conditions into a normal and a tangential step, whose sizes are controlled by a trust-region type parameter. Each entry in the filter is a pair of coordinates: one resulting from feasibility and centrality, and associated with the normal step; the other resulting from optimality (complementarity and duality), and related with the tangential step. Global convergence to first-order critical points is proved for the new primal-dual interior-point filter algorithm.
Original language | English |
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Pages (from-to) | 379-410 |
Number of pages | 32 |
Journal | Mathematical Programming |
Volume | 100 |
Issue number | 2 |
DOIs | |
State | Published - Jun 2004 |
Externally published | Yes |
Keywords
- Filter
- Global convergence
- Interior-point methods
- Primal-dual