A nonlinear augmented Lagrangian for constrained minimax problems

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摘要

A novel smooth nonlinear augmented Lagrangian for solving minimax problems with inequality constraints, is proposed in this paper, which has the positive properties that the classical Lagrangian and the penalty function fail to possess. The corresponding algorithm mainly consists of minimizing the nonlinear augmented Lagrangian function and updating the Lagrange multipliers and controlling parameter. It is demonstrated that the algorithm converges Q-superlinearly when the controlling parameter is less than a threshold under the mild conditions. Furthermore, the condition number of the Hessian of the nonlinear augmented Lagrangian function is studied, which is very important for the efficiency of the algorithm. The theoretical results are validated further by the preliminary numerical experiments for several testing problems reported at last, which show that the nonlinear augmented Lagrangian is promising.

论文关键词:Nonlinear augmented Lagrangian,Constrained minimax problems,Lagrange multiplier,Controlling parameter,Condition number

论文评审过程:Available online 9 November 2011.

论文官网地址:https://doi.org/10.1016/j.amc.2011.10.039