1) positive polar cone
正极锥
2) limiting normal cone
极限正规锥
3) Strongly minihedral and regular cone
强极小正则锥
4) polar cone
极锥
1.
In this paper we prove that if the polar cone Λ* of a closed convex cone Λis sharp or is generated by a closed ball not containing θ, then Λ is solid.
本文证明:当锥Λ的极锥是尖锥或由不含θ点的闭球体张成时,Λ是体锥;拟多面体锥Λ和极锥Λ*弱*内部非空锥类是一致的并指出了P。
5) Cone
[英][kəʊn] [美][kon]
正锥
1.
This paper presents an necessary and sufficient condition for subsemigroup to be cone ofL-group,and discusses the problem of extension on preorder groups.
得到了子半群是L-群的正锥的一个充要条件,并讨论了先序群的扩展问题。
6) positive cone
正锥
1.
The Positive Cones and The Simplicial Cones in the Topological Vector Space;
拓扑向量空间的正锥与单形
2.
In this paper, it is shown that, under the case of both real and complex, If an operator T∈B( L p (Ω 1), L p (Ω 2)) is almost isometric on the positive cone, where p ∈(0,1)∪(2,∞), then T is almost isometric on the whole space.
证明了在∈p(0,1)∪(2,∞)时,对于实和复的两种情形,若T∈B(Lp(Ω1),Lp(Ω2))在正锥上几乎等距,则T在全空间几乎等距。
补充资料:正极
原电池中电子流入的一极。
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