在一定条件下,论证了集函数多目标分式规划问题与其相应的标量化问题以及鞍点问题之间的密切关系。
Under suitable conditions, we give some theorems connecting multiobjective fractional programming with set functions and its scalarization problems as well as the corresponding saddle point problems.
主要研究含矩阵函数半定约束和向量函数等式约束以及多个目标函数的多目标半定规划的对偶和鞍点问题。
The paper studied the multiobjective semidefinite programming with a semidefinite constraint of a matrix function and a multiobjective function.
考虑了广义二次规划问题,基于其鞍点的充要条件,提出了求解它的一个神经网络。
This paper considers the extended quadratic programming problem. Based on the necessary and sufficient conditions for a saddle point, a neural network for solving it is proposed.
阐述了线性规划鞍点算法原理,讨论了解题器各模块的设计方法,给出了软件流程图和实验结果。
This paper proposed the principle of the saddle point algorithm, discussed the developing method about the new solver, provided the flow chart and the computational results of the new solver.
本文给出多目标规划有效解适应鞍点准则的一个新的判别法,它不使用凸性的几何术语及凸分析中的概念。
This paper offers a new characterization method for an efficient solution of multiobjective programming satisfying the saddle point criteria.
给出了齐次规划问题KKT点的一个等价性质,采用对约束函数k次方的方法得到齐次规划问题的一个局部鞍点。
When the object and constraint functions are continous, it shows the relations of KKT points and local saddle-points.
给出了齐次规划问题KKT点的一个等价性质,采用对约束函数k次方的方法得到齐次规划问题的一个局部鞍点。
When the object and constraint functions are continous, it shows the relations of KKT points and local saddle-points.
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