The Connected of Generalized a-Major Optimal Solution Set for Multiobjective Decison-Making
The research on the topological structure of major efficient solution set and optimal solution set is an important research topic in the study of multiobjective optimization.In this paper, the concept and properties of generalized CC — major optimal solution of infinite-dimensional multiobjective decision-making problem are studied.Under the condition that objective mapping is cone Hα -quasiconvex and cone Hα -bounded, the connectedness theorems of generalized CC — major optimal solution set are obtained and proven for infinitedimensional multi-objective decision-making problems.
infinite-dimensional multiobjective decision-making eneralized α — major optimal solution set quasiconvex connectedness
Yang Wanquan Ren weihua
School of Mathematics and Information Science,Wenzhou University,WenZhou 325035,China
国际会议
南京
英文
612-615
2011-09-15(万方平台首次上网日期,不代表论文的发表时间)