A superlinearly convergent method of feasible directions

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摘要

Method of feasible directions (MFD) is one of the most important methods for solving engineering optimization problems. There exist two types of MFD: one has at most a linear convergence rate and the other has a superlinear convergence rate. The former type includes Zoutendijk's MFD, Topkis–Veinott's MFD, Pironneau–Polak's MFD, Cawood–Kostreva's Norm-Relaxed MFD, and a modified MFD. The latter includes Panier–Tits' FSQP approaches. However, the price of the superlinearly convergent MFD for achieving superlinearity is rather high computational cost per single iteration. This paper presents an algorithm based on the modified MFD. The theoretical analysis shows that this algorithm is locally superlinearly convergent. This algorithm has attained the same convergence rate as FSQP while it only needs to solve two subproblems instead of three subproblems in FSQP. Hence, this algorithm should be computationally more efficient than FSQP.

论文关键词:Method of feasible directions (MFD),Nonlinear optimization,Engineering optimization,Sequential quadratic programming (SQP),Superlinear convergence rate,Linear convergence rate

论文评审过程:Available online 17 November 2000.

论文官网地址:https://doi.org/10.1016/S0096-3003(99)00176-9