By using a universal method a new existence theorem of solution for a generalized equilibrium problem in topological vector space is obtained.
通过一种具有普遍意义的方法,在线性拓扑空间中获得一个新的广义平衡问题解的存在性定理。
Based on resolution of interval Numbers and fuzzy resolution theorem, we develop a method of solving the structural fuzzy finite element equilibrium equations.
利用区间数的分解和模糊分解定理,研究了一种结构模糊有限元平衡方程的求解方法。
Using an O-KKM type theorem, some existence theorems of solutions for abstract generalized vector equilibrium problems in the framework of topological ordered spaces is proved.
在拓扑序空间的框架下,利用一个序KKM型定理证明了一些广义向量值均衡问题解的存在性定理。
By using the collectively fixed point theorem, the existence theorems of some new system of vector equilibrium problems are obtained.
作为应用,给出了聚合不动点定理在矢量平衡问题组中的应用。
This paper calculates the distribution function of equilibrium seriously based on Boltzmann H theorem and by use of the close equilibrium condition, and make a discussion generally.
在玻耳兹曼H定理的基础上,利用细致平衡原理,详细计算了平衡态的分布函数,并且进行了一般性的讨论。
Secondly, we design an approximated delay feedback control method by applying Taylor theorem; it can make the controlled system stabilize the expected periodic orbits or equilibrium points.
其次,应用泰勒展开定理,设计了一种近似的延迟反馈控制方法,将受控的系统稳定到希望的周期轨道或平衡点上。
The energy equilibrium model—The stability theorem on the strained quantum well structure materials have been introduced in the paper.
介绍应变量子阱材料的稳定性理论——能量平衡模型;
We give a center manifold theorem in the neighbourhood of the equilibrium point, and prove that the center manifold is exponentially decaying.
在此平衡点附近建立中心流形定理,并证明中心流形有空间指数衰减性。
Updated co-moving coordinate finite element based S-R decomposition theorem is convenient to track deformations of points in the deformed configures, to assure the mass equilibrium of element.
基于s - R分解原理的更新拖带坐标有限元法分析这类构件,有利于跟踪变形物体中各点的变化,保证单元的质量守恒。
We obtain equilibrium existence theorem of generalized games in L-convex space, where the preference correspondence is L_S-majorized mapping.
在L -凸空间中,证明了定性博弈和广义博弈的均衡存在定理。
By applying the fixed point theorem, several new existence theorems of solutions for quasi-equilibrium problems are given under noncompact setting of topological Spaces.
应用此不动点定理,在非紧的一般拓扑空间中给出了几个关于拟平衡问题的解的存在性定理。
In this paper, Guass theorem is mainly used to discuss the electric field intensity on the surface of charged conductor on condition of electrostatic equilibrium.
本文在静电平衡条件的基础上,应用高斯定理讨论带电导体表面的电场强度。
In this paper, Guass theorem is mainly used to discuss the electric field intensity on the surface of charged conductor on condition of electrostatic equilibrium.
本文在静电平衡条件的基础上,应用高斯定理讨论带电导体表面的电场强度。
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