1) arcwise connected convex
弧连通凸
1.
In the framework of locally convex topological vector space,the scalarization theorem,Kuhn-Tucker conditions as well as the duality theorem and the saddle points theorem on Henig proper efficient solutions with respect to the base for vector optimization involving arcwise connected convex maps are established separately.
在局部凸拓扑向量空间中,建立了弧连通凸映射向量优化问题关于基的Henig真有效解的标量化定理、Kuhn-Tucker条件、对偶性定理以及鞍点定理。
2.
In this paper, the concept of the arcwise connected convex set-valued maps is introduced in topological spaces and a theorem of alternative established.
在拓扑向量空间中引入弧连通凸集值映射的概念 ,建立了择一定理 ,证明了标量化定理和La grange乘子定理。
2) symmetric arcwise-connected convex function
对称弧式连通凸函数
4) arcwise connected
弧连通
1.
In R~n spaces,we study optimality sufficient conditions and dual model for non-convex maximum and minimal fractional problems,under arcwise connectedness and generalized arcwise connectedness assumptions.
通过引入广义弧连通概念,在R~n空间中,研究极大极小非凸分式规划问题的最优性充分条件及其对偶问题。
5) Q-arcwise connected
拟弧连通
6) P-arcwise connected
伪弧连通
补充资料:单连通和多(复)连通超导体(simplyandmultiplyconnectedsuperconductors)
单连通和多(复)连通超导体(simplyandmultiplyconnectedsuperconductors)
单连通超导体一般指的是不包含有非超导绝缘物质或空腔贯通的整块同质超导体,若有非超导绝缘物质或空腔贯通的超导体则称为多(复)连通超导体。从几何学上讲,在超导体外表面所包围的体积内任取一曲线回路,这回路在超导物质内可收缩到零(或点),且所取的任意回路均可收缩到零而无例外,则称单连通超导体。若有例外,即不能收缩到零,则称多连通超导体。例如空心超导圆柱体,则在围绕柱空腔周围取一回路就不能收缩为零。多连通超导体可有磁通量子化现象(见“磁通量子化”)。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条