Based universal Grey number's characteristic, universal Grey matrix is defined and universal Grey matrix Solution Method to universal Grey Linear Equations is introduced.
根据泛灰数的性质,定义了泛灰矩阵,提出了泛灰线性方程组的泛灰矩阵解法,并给出了算例。
The matrix form solution of the steady-state probability was derived by the Markfov process method and the matrix solution method. Some performance measures of the system such as th…
利用马尔科夫过程理论和矩阵解法求出了稳态概率的矩阵解,并得到了系统的平均队长、平均等待队长以及顾客的平均止步率等性能指标。
Square root method is one of direct methods, which is an effective method for the solution of symmetrical positive liner equations through triangle decomposition of symmetrical positive matrix.
直接法中的平方根法,就是利用对称正定矩阵的三角分解而得到的求解对称正定方程组的一种有效方法。
By using the matrix geometric solution method, we derive the explicit expressions for steady-state probability vector.
利用矩阵几何解的方法,导出了系统稳态概率向量的明显表达式。
The condition of steady state solution in the interaction between multi atom and single mode field is presented by using the method of drift matrix.
利用迁移矩阵方法,给出了多原子体系与单模腔场相互作用的稳态解条件。
By using fundamental solution matrix and method of perturbation, we give the expression of general solutions for two classes of differential equations.
运用基解矩阵和摄动方法,给出了两类微分方程的通解表达式。
Based on the network impedance matrix and the load flow solution, a novel method for allocation of transmission losses is proposed in this paper.
提出了一种基于网络阻抗矩阵和潮流解的输电系统网损分摊方法。
The response matrix technique was used for the iterative solution of the nodal diffusion equations, which greatly improves the computational efficiency of this method.
将响应矩阵技术应用于迭代求解过程,使得该方法具有较高的计算效率。
This design method has a more relaxed solution conditions than that of the approach of using a fixed common matrix.
这种方法的求解条件比公共矩阵法的求解条件要宽松。
At meanwhile, it can be seen that different state gain matrix can be gotten by applying different solution method for a certain question of pole-placement of state feedback.
对于一个确定的状态反馈极点配置问题,当采用不同的方法去求解时,可以得到不同的状态增益阵。
The sparse vector method enhances the efficiency of matrix solution algorithms by exploiting the vector sparsity. It has been successfully applied to many problems arising in power systems.
稀疏向量法通过利用向量的稀疏性来提高求解矩阵方程的效率,它被成功地应用到电力系统分析的众多问题。
The usual ways to study the subject are the transfer-matrix method, combination solution, the renormalization-group technique, and graphic expansion, and so forth.
在研究这类问题时,常用的理论方法有转移矩阵法、组合解法、重整化群方法及图形展开法等。
In this paper, an iterative method is presented to find the least squares centrosymmetric solution to a kind of matrix equations.
本文提出了求一类矩阵方程组的最小二乘中心对称解的一种迭代法。
The solution to the problem of parametric linear programming by lumped matrix is discussed and ordinary method is given.
用分块矩阵法讨论了参数线性规划问题的求解方法,并给出了一般的公式。
Then the analytical solution is obtained for transversely isotropic multi-layered elastic subgrade under arbitrary loadings by means of transferring matrix method.
然后再利用传递矩阵技术,给出了任意荷载作用下的层状横观各向同性弹性地基的解析解。
By this iterative method, the solvability of the equations can be determined automatically, and its reflexive matrix solution or least-norm reflexive matrix solution can be got within finite steps.
该算法可以判断矩阵方程组是否有自反矩阵解,并在有自反矩阵解时,可以在有限步迭代计算之后得到矩阵方程组的一个自反矩阵解或者极小范数自反矩阵解。
By using the characteristic vector method, the fundamental matrix solution is obtained.
采用特征向量法求其基本矩阵解。
In this paper, iterative method in groups for solving these three matrix equations is studied when the equation has a unique solution.
本文讨论这三类线性矩阵方程惟一解的分组迭代解法。对三类矩阵方程的几类迭代格式的分组迭代解法,主要解决了如下几个问题。
The best synthetic method was solution polymerization and the toughening efficiency was related to morphology, interfacial bonding and matrix deformation of the system.
其合成方法以溶液聚合为好。增韧效果与体系相态结构、界面键合和环氧基体的延展性有关。
In the algorithm test, Runge-Kutta method and the Picard approximation method were used to make the solution for the matrix equation of the profile calculation, and I evaluated the data obtained.
在算法测试中,采用四阶龙格库塔法和毕卡逼近法分别对姿态矩阵方程进行了解算,并对得到的数据进行测试和评估。
Based on transfer matrix method (TMM) and virtual boundary element method (VBEM), proposed a direct solution to 2-d sound-structure interaction problem under harmonic excitation is proposed.
本文基于传递矩阵法(TMM)和虚拟边界元法(VBEM),提出了一种求解在谐激励作用下二维结构-声耦合问题的直接法。
Using the quasi-birth-and-death process method, we derive the equilibrium condition of the system and the matrix-geometric solution of the steady-state probability vectors.
通过拟生灭过程的方法求出了系统稳态平衡条件和稳态概率向量的矩阵几何解,并给出了系统的一些性能指标和数值结果。
Using the quasi-birth-and-death process method, we derive the equilibrium condition of the system and the matrix-geometric solution of the steady-state probability vectors.
通过拟生灭过程的方法求出了系统稳态平衡条件和稳态概率向量的矩阵几何解,并给出了系统的一些性能指标和数值结果。
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