复一致凸空间是比复严格凸空间更强的空间。
The complex uniform convex space is stronger than the complex strict convex space.
本文主要讨论介于一致凸和严格凸之问的一些推广及其关系。
This paper discusses some extension of uniform convex Banach space and their relations.
然后证明具有非标准约束的常数模准则在适当条件下是严格凸的。
Furthermore, we show that the constant modulus cost function with non-canonical constraint is strictly convex under some conditions.
本文进一步研究了严格凸空间的性质,并给出了等距算子为线性算子的一个充分条件。
In this paper the properties of the strictly convex space are studied further. In the time this paper further gives a sufficient condition that isometric operator is linear operator.
较系统地建立了U -性质,严格凸,中点局部一致凸等几何量之间的关系。给出了广义-空间是U -空间的刻画。
The connection between U-property and uniformly convexity, uniformly locally mid-points convexity are constructed, the U-property of the generalized lp-space and its quotient space is given.
较系统地建立了U -性质,严格凸,中点局部一致凸等几何量之间的关系。给出了广义-空间是U -空间的刻画。
The connection between U-property and uniformly convexity, uniformly locally mid-points convexity are constructed, the U-property of the generalized lp-space and its quotient space is given.
应用推荐