1) cover factor
复盖系数
2) Cover
复盖
1.
This paper proves that sub - space cannot cover the whole linear space and concludes with some important relevant inferences which provides theoretic basis for the characteristics of linear space.
论证了有限个真子空间复盖不了整个线性空间,并以此得出几个与真子空间有关的重要定理和推论,为深入线性空 间的性质讨论提供了依据。
2.
In this paper mesocompactness is characterized in term of well-monotonecover, interior-preserving cover,suborthocompact and cushioned refinement,which improves the results of Guoshi Gao and Lisheng Wu.
本文利用良序单调复盖、内部保持复盖、次ortho-紧及垫状加细等刻画了中紧性。
3) covering
复盖
1.
Let f (k, r, n ) be the number of the coverings of Rk+r, nk by 1 ×k or k×1 rectangles, F (k, r, x ) be the generating function for the sequence { f (k, r, n ) }, we show that which generalizes the result of Tomescu [ 2, 3
设k≥2,m<2k,本文研究用1×k矩形复盖标号m×n矩形的问题,得到了完全复盖的充要条件,并未得复盖数的生成函教,从而推广了Tomescu[2]的结果。
4) covered degree
复盖度
5) method of compacting covering
碾压复盖
6) CFP-covers
cfp复盖
1.
In this paper,the characterizations of metric spaces under compact-covering π-s maps are established by means of CFP-covers and point-star networks.
借助cfp复盖和点星网,给出了度量空间的紧复盖π-s映射的特征。
参考词条
补充资料:复相关系数
分子式:
CAS号:
性质:又称复相关系数。在多元回归分析中,它表示因变量y与自变量x1,x2…xn整体之间线性相关的程度,而不能确切说明因变量与各自变量之间的相关程度。
CAS号:
性质:又称复相关系数。在多元回归分析中,它表示因变量y与自变量x1,x2…xn整体之间线性相关的程度,而不能确切说明因变量与各自变量之间的相关程度。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。