1) complex-valued differrential form
复值微分形式
2) complex differential form
复微分形式
3) real-valued differential form
实值微分形式
4) differential form
微分形式
1.
The above conclusion is demonstrated in the light of poincare theorem, it is demonstrated by using contraction (interior product) of vector field and differential form as well as operation of exterior differentiation.
运用向量场与微分形式的缩并 (内积 )和外微分运算 ,并依照 Poincare定理论证电荷的运动规律可确定电磁场的运动规
2.
By estimating the koppelman kernel on Complex Manifolds, the difference between the koppelman kernel on complex manifolds and the Bochner Martinelli koppelman on C n was obtained;and then by utilizing the koppelman formula and the result as above, the jump formula of differential forms under Berndtsson transform on Complex manifolds was derived.
引入复流形上的Koppelm an 核与微分形式的Berndtsson 变换, 并对复流上的Koppelm an 核进行估算,得出其与Cn 空间的Bochner-Martinelli-Koppelm an 核之差为O(- 2n +1n )。
3.
By the natural and harmonious relationship between differential forms and differential equations and between differential forms and vector analysis, we discuss the properties, which are covariant under the transformation of coordinates in the framework of differential forms, of particle motion in a central force field.
通过微分形式与微分方程和向量分析之间存在的自然而协调的关系,在微分形式框架下讨论了质点在有心力场中运动的特性并得出在坐标变换下其均是协变的
5) differential forms
微分形式
1.
The Hypo-elliptic Differential Forms on Smooth Manifolds;
光滑流形上微分形式的亚椭圆性
2.
Let X be a smooth oriented Riemannian n-manifold without boundary,l-form W be WT2 class of differential forms on X.
令X是一个光滑可定向的n维无边黎曼流形,l-形式W是X上的WT2类微分形式,如果它的结构常数v1、v2满足一定的条件,则对于dφ=ω的l-1-1形式φ的模满足Holder连续性。
6) Cauchy's mean-value theorem in integral form
柯西微分中值定理的积分形式
补充资料:实值
1.亦作"实直"。 2.实际价格。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
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