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线性不等式约束的广义非线性互补问题的仿射内点信赖域方法
引用本文:朱德通,蔡力. 线性不等式约束的广义非线性互补问题的仿射内点信赖域方法[J]. 数学年刊A辑(中文版), 2010, 31(1): 13-34
作者姓名:朱德通  蔡力
作者单位:上海师范大学商学院;上海师范大学数学系;
基金项目:国家自然科学基金(No.10871130); 上海市重点学科建设基金(No.T0401)资助的项目
摘    要:提供了一种新的非单调内点回代线搜索技术的仿射内点信赖域方法解线性不等式约束的广义非线性互补问题(GCP).基于广义互补问题构成的半光滑方程组的广义Jacobian矩阵,算法使用l_2范数作为半光滑方程组的势函数,形成的信赖域子问题为一个带椭球约束的线性化的二次模型.利用广义牛顿方程计算试探迭代步,通过内点映射回代技术确保迭代点是严格内点,保证了算法的整体收敛性.在合理的条件下,证明了信赖域算法在接近最优点时可转化为广义拟牛顿步,进而具有局部超线性收敛速率.非单调技术将克服高度非线性情况加速收敛进展.最后,数值结果表明了算法的有效性.

关 键 词:半光滑方程  信赖域方法  广义非线性互补问题  仿射内点  

Affine Scaling Interior Trust-Region Method for Solving Generalized Complementarity Problems with Linear Inequality Constraints
ZHU Detong and CAI Li. Affine Scaling Interior Trust-Region Method for Solving Generalized Complementarity Problems with Linear Inequality Constraints[J]. Chinese Annals of Mathematics, 2010, 31(1): 13-34
Authors:ZHU Detong and CAI Li
Affiliation:ZHU Detong~1 CAI Li~2 1 Business College,Shanghai Normal University,Shanghai 200234,China. 2 Department of Mathematics
Abstract:This paper proposes a new affine scaling trust-region method in association with nonmonotonic interior backtracking line search technique for solving the generalized complementarity problems(GCP) with linear inequality constraints.The proposed algorithm uses a generalized Jacobian of the function involved the semismooth equations reformulated from the GCP and adopts squared Euclidean norm of the semismooth equations as a merit function.Based on a simply constrained differentiable minimization reformulation,...
Keywords:Semismooth equation  Trust region method  Generalized complementarity problems  Affine scaling interior point  
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