共查询到16条相似文献,搜索用时 171 毫秒
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本文引入了一类新的广义凸函数—强预拟不变凸函数.讨论了强预拟不变凸函数与预拟不变凸函数、严格预拟不变凸函数及半严格预拟不变凸函数之间的关系,得到它的三个充要条件:(i)当条件P_1满足时,f是强预拟不变凸函数的充分必要条件是f是预拟不变凸函数且f满足中间点强预拟不变凸性;(ii)当条件P_2满足时,f是强预拟不变凸函数的充分必要条件是f是严格预拟不变凸函数且f满足中间点强顶拟不变凸性;(iii)当条件P_2满足时,f是强预拟不变凸函数的充分必要条件是f是半严格预拟不变凸函数且f满足中间点强预拟不变凸性. 相似文献
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陈乔 《纯粹数学与应用数学》2013,(6):621-626
引入了严格r-预不变凸函数的概念,并证明了严格r-预不变凸函数与r-预不变凸函数有关的一个充分条件.同时,讨论得到了严格r-预不变凸性和半严格r-预不变凸性的等价条件. 相似文献
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严格预不变凸函数的两个性质 总被引:5,自引:1,他引:4
我们考虑了由杨和李在[2]中引入的严格预不变凸函数,并得到了严格预不变凸函数的两个性质,这些性质包括与中间点严格预不变凸性和预不变凸函数有关的一个充分条件以及与半严格预不变凸函数和中间点严格预不变凸性有关的一个等价条件. 相似文献
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提出了一类新的广义凸函数——半严格-G-E-半预不变凸函数,它是一类非常重要的广义凸函数,为半严格-G-半预不变凸函数与半严格-E-预不变凸函数的推广.首先给出例子,以说明半严格-G-E-半预不变凸函数的存在性及其与其他相关广义凸函数间的关系.然后讨论了半严格-G-E-半预不变凸函数的一些基本性质.最后,探究了半严格-G-E-半预不变凸型函数分别在无约束和有约束非线性规划问题中的重要应用,获得一系列最优性结论,并举例验证了所得结果的正确性. 相似文献
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研究了D-η-E-半预不变凸映射和D-η-E-半预不变真拟凸映射的一些性质.首先,讨论了D-η-E-半预不变凸与D-η-E-严格半预不变真拟凸、D-η-E-半严格半预不变真拟凸和D-η-E-半预不变真拟凸之间的关系,在中间点的D-η-E-半预不变凸性和其他一些条件下,得到了它的3个重要的性质定理;其次,对D-η-E-半预不变真拟凸与D-η-E-半严格半预不变真拟凸和D-η-E-严格半预不变真拟凸之间的关系也进行了讨论;最后,获得了D-η-E-半预不变真拟凸映射在优化中的一个重要应用. 相似文献
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提出了一类新的广义凸函数——半严格-G-半预不变凸函数,它是一类重要的广义凸函数,是半严格预不变凸函数和半严格-G-预不变凸函数的真推广.首先,用例子说明了半严格-G-半预不变凸函数的存在性,并给出例子说明它是与G-半预不变凸函数不同的一类函数;然后,给出了半严格-G-半预不变凸函数的几个基本性质;最后,讨论了半严格-G-半预不变凸函数分别在无约束和带不等式约束的非线性规划问题中的应用,得到了一些最优性结果,并举例验证所得结论的正确性. 相似文献
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研究了锥意义下的半预不变凸性的新性质.首先,对彭再云等的文献(彭再云,李科科,唐平,黄应全.向量值D-半预不变真拟凸映射的判定与性质[J].重庆师范大学学报(自然科学版),2014,31(5):18-25.)中的例4进行了修正,使其满足条件E.然后,给出了条件E1的一个重要性质,并在此基础上结合稠密性结果,分别利用D-半严格半预不变真拟凸性和D-严格半预不变真拟凸性建立了D-半预不变凸性的刻画.最后利用D-半预不变真拟凸性给出了D-半预不变凸性的刻画. 相似文献
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该文首先得到了严格B -预不变凸函数的一个充分条件,然后给出了严格 B -预不变凸函数的一些性质,最后得到了关于目标函数为严格 B -预不变凸函数的极小化问题的若干结果. 相似文献
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In this paper, we consider the cone semistrictly preinvex function introduced by Peng and Zhu (J Inequal Appl 93532:1–14,
2006). The relationship between cone semistrictly preinvex functions and cone preinvex functions is investigated. A property
of the cone semistrictly preinvex function is obtained. 相似文献
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In Refs. [J. Math. Anal. Appl. 258:287–308, [2001]; J. Math. Anal. Appl. 256:229–241, [2001]], Yang and Li presented a characterization of preinvex functions and semistrictly preinvex functions under a certain set
of conditions. In this note, we show that the same results or even more general ones can be obtained under weaker assumptions;
we also give a characterization of strictly preinvex functions under mild conditions.
This research was supported by the National Natural Science Foundation of China under Grants 70671064 and 60673177, and the
Education Department Foundation of Zhejiang Province Grant 20070306. The authors thank Professor F. Giannessi for valuable
comments on the original version of this paper. 相似文献
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A. Barani 《Journal of Mathematical Analysis and Applications》2007,328(2):767-779
The concept of a geodesic invex subset of a Riemannian manifold is introduced. Geodesic invex and preinvex functions on a geodesic invex set with respect to particular maps are defined. The relation between geodesic invexity and preinvexity of functions on manifolds is studied. Using proximal subdifferential, certain results concerning extremum points of a non smooth geodesic preinvex function on a geodesic invex set are obtained. The main value inequality and the mean value theorem in invexity analysis are extended to Cartan-Hadamard manifolds. 相似文献
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在赋范线性空间中借助切导数研究集值优化问题的严有效性.当目标函数和约束函数相对于同一向量函数为拟不变凸时,利用凸集分离定理给出了集值优化问题取得严有效元的Kuhn—Xhcker型最优陛必要条件.利用切导数的性质,用构造性方法得到了拟不变凸集值优化问题取得严有效元的充分条件. 相似文献
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REMARKS ON CRITERIA OF PREQUASI-INVEX FUNCTIONS 总被引:6,自引:0,他引:6
Luo Hezhi Wu Huixian Zhu Yihua Dept.of Math. Shanghai Univ. Shanghai China. Dept.of Appl.Math. Zhejiang Univ.of Technology Zhejiang China. College of Science Hangzhou Dianzi Univ. Zhejiang China. College of Business Administration Zhejiang Univ. of Technology Zhejiang China. 《高校应用数学学报(英文版)》2004,19(3):335-341
§1 IntroductionConvexity and generalized convexity play a central role in mathematical economics,engineering,managment science,and optimization theory.Therefore,the research onconvexity and generalized convexity is one of the most important aspects in mathematicalprogramming.Recently,[1] derived criteria for quasiconvex functions under lowersemicontinuity and upper semicontinuity conditions.In[2 ] Yang et al introduced variousconceptsof prequasi-invex functions,types ofgeneralized version o… 相似文献
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Characterizations and Applications of Prequasi-Invex Functions 总被引:22,自引:0,他引:22
Yang X. M. Yang X. Q. Teo K. L. 《Journal of Optimization Theory and Applications》2001,110(3):645-668
In this paper, two new types of generalized convex functions are introduced. They are called strictly prequasi-invex functions and semistrictly prequasi-invex functions. Note that prequasi-invexity does not imply semistrict prequasi-invexity. The characterization of prequasi-invex functions is established under the condition of lower semicontinuity, upper semicontinuity, and semistrict prequasi-invexity, respectively. Furthermore, the characterization of semistrictly prequasi-invex functions is also obtained under the condition of prequasi-invexity and lower semicontinuity, respectively. A similar result is also obtained for strictly prequasi-invex functions. It is worth noting that these characterizations reveal various interesting relationships among prequasi-invex, semistrictly prequasi-invex, and strictly prequasi-invex functions. Finally, prequasi-invex, semistrictly prequasi-invex, and strictly prequasi-invex functions are used in the study of optimization problems. 相似文献