还给出了计算此非线性方程组解的递推算法和程序框图。
To solve the equations numerically, a recurrent algorithm and its corresponding flow chart was also given in this paper.
由非齐次线性方程组解的结构给出静态工作点的基础解;
Then, the basic solution set of conical magnetic bearing static operation points is given based on the solution structure of linear equation group.
利用齐次线性方程组解的理论讨论矩阵的秩,给出几个关于矩阵秩的著名不等式的证明,并证明了两个命题。
The article discusses rank of a matrix by the solution theorem of system of homogeneous linear equations, and proves several famous inequalities and two propositions on rank of a matrix.
利用齐次线性方程组解的理论讨论矩阵的秩,给出几个关于矩阵秩的著名不等式的证明,并证明了两个命题。
The judgment theorems for locating correctness were concluded by skillfully combining the solutions of homogenous linear equations with locating schemes.
结果表明,该方法计算速度快、精度高,解决了求解非线性方程组解的模糊性问题,确保了测试结果的可靠性。
It is shown that the method is quick and precise, and the problem of the ambiguity for nonlinear equations and the measurement reliability are solved.
在正统理论的基础上 ,提出了单电子三势垒隧穿结模型的主方程 ,并用线性方程组解法求出了其稳态解 。
The master equation of the single electron triple barrier tunnel junction(TBTJ) model is developed based on the orthodox theory.
否则,此线性方程组无解,或者无穷解?
Otherwise, well, AX equals B has either no solution, or infinitely many solutions. Yes?
Meschach可以解稠密或稀疏线性方程组、计算特征值和特征向量和解最小平方问题,另外还有其它功能。
Meschach was designed to solve systems of dense or sparse linear equations, compute eigenvalues and eigenvectors, and solve least squares problems, among other things.
,这是我的计划:线代的基本问题是用来解线性方程组(systemof linear equations)。
, this is my plan, the fundamental problem of linear algebra, which is to solve a system of linear equations.
该系统所采用的算法由于作了某些必要的近似处理,避免了直接解非线性方程组同时又满足了精度要求。
By making some necessary approximations, the algorithm used for this system is able to avoid solving directly system of nonlinear equations without losing the expected accuracy.
通过对离散傅立叶逆变换的分析,我们得到一个线性方程组,它的解可以作为序列的谱。
Analyzing inverse DFT, we obtained a system of linear equations, whose solution can be taken as the spectrum of the data series.
根据三对角矩阵的特点,给出一种利用解线性方程组的方法求三对角矩阵的逆矩阵的算法。
In this paper, an algorithm for finding the inverse matrix of tridiagonal matrix by solving systems of linear algebraic equations is proposed.
通过将问题的KKT系统转化成一个约束方程,算法在每步迭代只需解一个线性方程组即可得到搜索方向。
By reformulating the KKT system as a constrained equation, the algorithm generates the search direction by solving a linear equation at each iteration.
瑞士数学家,因解线性方程组的克莱姆法则而为今人所知。
Swiss mathematician who is known today for Cramer's rule for solving a system of linear equations.
给出了一个判定齐次线性方程组存在全非零解的充分必要条件。
We present a necessary and sufficient conditions of homogeneous linearity equations existing all-nonzero solution.
线性流行的概念对理解线性空间以及线性方程组的解的结构具有重要意义。
The concept of linear manifold has an important meaning for understanding the linear space and system of linear.
由离散解得到的非对称线性方程组,对于QPNS采用块三对角法,对于FNS采用GMRES算法。
The nonsymmetric and linear equations from the discrete solution are solved by using block tridiagonal systems for the QPNS equations and by GMRES algorithm for the FNS equations.
采用线性畸变模型,由最小二乘法解线性方程组得到摄像系统畸变模型的畸变系数。
Linear distortion model is used and distortion coefficients are obtained by resolving over-determined linear equations and least square method.
给出了求齐次线性方程组正交的基础解系的一个简便方法和一个应用实例。
A simple method for the orthogonal fundamental solution of homogeneous linear equation system and the example in its application are given.
对有定号解的线性方程组或有定号零空间的实矩阵进行了更深入的研究。
In this paper, a more careful research on linear systems with signed solutions and real matrices with signed zero - space is made.
采用线性畸变模型,由最小二乘法解线性方程组得到摄像系统畸变模型的畸变系数。
Linear distortion model was used and the distortion coefficients were obtained by resolving overdetermined linear equations and least square method.
然后再将序列化的轮廓点映射到用户交互绘制的一条草图线上,通过解线性方程组求出变形后各顶点的新坐标。
Then the serialized silhouette points are projected to a line sketched by the user interactively and the new coordinate of vertices are achieved after solving the linear equations.
在一些假定条件下,证明了最优控制为一非线性方程组的解。
Under certain conditions, it is proved that optimal control law is the solution of nonlinear equations.
在线性方程组有解判别定理的基础上,给出了一个判定非齐次线性方程组存在全非零解的方法。
On the basis of the solution identification theorem in linear equations, a method is presented to ascertain whether there exists all-nonzero solutions to an inhomogeneous linear equation.
本文定义了多项式的B-网结式,讨论了B-网结式的性质和B-网结式与非线性方程组的解之间的关系。
The B-net resultant of polynomials is defined, and its properties and the relations between it and the solutions of a system of nonlinear equations are discussed.
研究了矩阵列(行)一致扰动的几个性质,并应用于线性方程组。给出了线性方程组系数矩阵一致扰动下解的相对误差界。
Several properties about matrix with consistent perturbation are studied and applied into linear equations. Error bounds with the solution perturbation are given.
求得了速度和温度的耦合非线性方程组的近似解。
Approximate solutions for the coupled non-linear equations are obtained for the velocity and the temperature.
变速箱转速分析可以归结为解线性方程组问题。
The analysis of transmission speed can be summed up as the solution of linear equation set.
变速箱转速分析可以归结为解线性方程组问题。
The analysis of transmission speed can be summed up as the solution of linear equation set.
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