Examples of 'eigenvalue problem' in a sentence
Meaning of "eigenvalue problem"
eigenvalue problem: In mathematics, particularly linear algebra, an eigenvalue problem refers to the calculation of the eigenvalues (characteristic values) of a square matrix. It is used to determine special scalars associated with a matrix that represent important properties of the matrix
How to use "eigenvalue problem" in a sentence
Basic
Advanced
eigenvalue problem
These equations are a generalized eigenvalue problem.
Matrix eigenvalue problem.
Derivative of a generalized eigenvalue problem.
Iterative algorithms solve the eigenvalue problem by producing sequences that converge to the eigenvalues.
The above equation is called the eigenvalue equation or the eigenvalue problem.
The associated eigenvalue problem is.
The optimal threshold function is derived by solving a maximum generalized eigenvalue problem.
Moser iteration and a nonlinear eigenvalue problem on metric spaces.
The problem of finding the eigenvalues of a pencil is called the generalized eigenvalue problem.
Considering the eigenvalue problem.
We propose a finite element discretization for this spectral problem leading to a generalised eigenvalue problem.
We consider the eigenvalue problem.
The iterations allow the simultaneous convergence of the domain decomposition and the eigenvalue problem.
Which is a standard eigenvalue problem.
Here, a quadratic eigenvalue problem has to be used to investigate the system.
See also
It is a generalized eigenvalue problem.
Thus the eigenvalue problem for all normal matrices is well-conditioned.
We make the approximation that the solution of the eigenvalue problem of a conjugated system.
Then the generalised eigenvalue problem of the Ritz method turns into an eigenvalue problem.
This usage should not be confused with the generalized eigenvalue problem described below.
The solution of the differential eigenvalue problem also depends on any boundary conditions required of f.
This is achieved through a Fourier Floquet method resulting into an eigenvalue problem.
Resolution of the Generalized Eigenvalue Problem for symmetric matrices.
We study the eigenvalue problem of the Faraday tensor associated with the Liénard-Wiechert electromagnetic field.
This particular representation is a generalized eigenvalue problem called Roothaan equations.
Then, a quadratic eigenvalue problem is shifted to compute the stability and bifurcation points.
The derivative jumps of eigenfunctions of the VPAW eigenvalue problem are significantly reduced.
Solving the eigenvalue problem ( Schrödinger equation ) ¶.
We find an approximate solution to the corresponding eigenvalue problem using the Galerkin method.
First we investigate the eigenvalue problem for the linear transport-fragmentation operator.
This leads to a non-linear eigenvalue problem.
Factorization-free, i.e. does not require any matrix decomposition even for a generalized eigenvalue problem.
In addition, we study a nonlinear eigenvalue problem in this setting.
The general problem, with nonzero damping, is a quadratic eigenvalue problem.
This facilitates an approximate analytical solution to the eigenvalue problem for the Hamiltonian operator.
In certain cases, it is possible to deflate an eigenvalue problem into smaller problems.
First-order perturbation theory also leads to matrix eigenvalue problem for degenerate states.
In Chapter 7 we study an elliptic nonlinear eigenvalue problem on the sphere.
Quantization as an Eigenvalue Problem ".
You'll also be interested in:
Examples of using Eigenvalue
Show more
It can be understood as the eigenvalue of a charge operator
The eigenvalue concept is not restricted to energy
A natural way to do this is by eigenvalue analysis of a matrix
Examples of using Problem
Show more
The problem is this is meant to be a family trip
I heard you got a problem with ghosts
Not a problem because we have her here
