eigenvalue problem [ˈaiɡənˌvælju: ˈprɔbləm] 释义 本征值问题,特征值问题 实用场景例句 全部 To this end we shall first consider the followingeigenvalue problem. 为此目的,我们将首先考虑下列的本征值问题. 辞典例句 An inverseeigenvalue problemfor damped gyroscopic systems is ...
这本书的一个重要部分花在特征值问题(eigenvalue problem)的解决方案上了,今天那里所讨论的方法几乎没有被应用到。实… blog.sciencenet.cn|基于43个网页 2. 特徵值问题 为一特徵值问题(eigenvalue problem),其中能量 E 及波函数 ψ 为待 定。如解出 ψ = ψ n ( x ), n 为量子数(quantum numb… ...
generalized eigenvalue problem 广义本征值问题 membrane eigenvalue problem 膜本征值问题 matrix eigenvalue 矩阵特征值,矩阵特征值 membrane eigenvalue 膜本征值 reciprocal eigenvalue 逆本征值 generalized eigenvalue 广义特征值 degenerate eigenvalue 【计】 退化本征值 end eigenvalue 末端本征值 ...
网络特徵值问题 网络释义 1. 特徵值问题 7-17.1特徵值与特徵向量特徵值问题(eigenvalueproblem)若A为一nn矩阵,在Rn中是否存在著非零向量x,使得Ax与x之间存在 … www.tw100s.com|基于5个网页
generalized eigenvalue problem 广义本征值问题 generalized eigenvalue 广义特征值 eigenvalue problem 本征问题,本征值问题,特征值问题,斯图姆-刘维尔问题 membrane eigenvalue problem 膜本征值问题 degenerate eigenvalue 【计】 退化本征值 matrix eigenvalue 矩阵特征值,矩阵特征值 membrane eigenvalue 膜...
Since (u, v) = a(Gv, v) for all u, v∈ V by definition of the mapping G, the eigenvalue problem amounts to finding the inverses of the eigenvalues of the mapping G: V→ V (clearly, zero cannot be an eigenvalue of the mapping G nor of the original problem). If we finally ...
Eigenvalue problems are ubiquitous in science and engineering; they occur whenever something is oscillating in a periodic motion. Historically, a very famous eigenvalue problem is related to the beautdoi:10.1007/978-3-319-04325-8_7Walter Gander...
Eigenvalue problems are very common in physics. In many cases they involve solution of a homogeneous system of linear equations with a Hermitian (or symmetric, if real) matrix. The direct solution of the eigenvalue problem is only possible for matrices of very small dimension. For medium-sized...
We develop normwise backward errors and condition numbers for the polynomial eigenvalue problem. The standard way of dealing with this problem is to reform... F Tisseur - 《Linear Algebra & Its Applications》 被引量: 501发表: 2000年 Perturbation theory of eigenvalue problems : lectures delivered...
In obtaining Legendre polynomials as solutions to Legendre's equation, $$(1\, - \,x^2 )\,P''(x)\, - \,2xP'(x)\, + \,\lambda P(x)\, = \,0,$$ we have solved a typical eigenvalue problem. Given an equation (or set of equations) containing a parameter (here l), we see...