| 1. | A way to find the set of optimal solutions in linear fractional programming 线性分式规划最优解集的求法 |
| 2. | Sensitivity analysis of linear frational programming and its application 线性分式规划的灵敏度分析及其应用 |
| 3. | Multiple objective linear fractional programming based on fuzzy set theory 基于模糊集理论的多目标线性分式规划 |
| 4. | The optimal conditions of the linear fractional programming problem with constraint 带有约束线性分式规划问题的最优性条件 |
| 5. | Mixed type duality for a class of nondifferentiable generalized fractional programming 一类非可微广义分式规划的混合型对偶 |
| 6. | A note on necessary optimality conditions for a class of generalized fractional programming 一类广义分式规划最优性必要条件的注记 |
| 7. | The structure and search procedure of solution sets of linear fractional programming in general form 一般形式线性分式规划解集的结构与求法 |
| 8. | Necessary optimality conditions for a class of nondifferentiable generalized fractional programming 一类非可微广义分式规划的最优性必要条件 |
| 9. | In the paper , we generalize and improve the subject investigated and the assumptions being used , while achieving similar results via the combination of the methods and techniques which are used to fractional programming and bilevel programming study 本文在研究对象和所用假设条件方面都做了一些推广和改进,结合运用分式规划和双层规划的研究方法和技巧,得到了类似的结果。 |
| 10. | In view of these , the second part of this paper presents two sufficient conditions and two mixed type duals for the generalized fractional programming only under ( f , ) - convexity assumptions . these sufficient conditions apply to a broader class of mathematical programming problems . the results about weak duality , strong duality and strictly reverse duality are also presented under more suitable conditions 鉴于此,本文的第二部分,我们仅在函数( f , ) ?凸性假设下,给出了广义分式规划的二个最优性充分条件,这些充分条件较文献中的相关的条件有更广泛的适用性;同时还给出了混合型对偶,并且在适当的条件下,给出了相应的弱对偶定理、强对偶定理,以及严格逆对偶定理。 |