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Monday, September 25, 2023

Eigenvalue perturbation

From Wikipedia, the free encyclopedia

In mathematics, an eigenvalue perturbation problem is that of finding the eigenvectors and eigenvalues of a system that is perturbed from one with known eigenvectors and eigenvalues . This is useful for studying how sensitive the original system's eigenvectors and eigenvalues are to changes in the system. This type of analysis was popularized by Lord Rayleigh, in his investigation of harmonic vibrations of a string perturbed by small inhomogeneities.

The derivations in this article are essentially self-contained and can be found in many texts on numerical linear algebra or numerical functional analysis. This article is focused on the case of the perturbation of a simple eigenvalue (see in multiplicity of eigenvalues)

Why generalized eigenvalues?

In the entry applications of eigenvalues and eigenvectors we find numerous scientific fields in which eigenvalues are used to obtain solutions. Generalized eigenvalue problems are less widespread but are a key in the study of vibrations. They are useful when we use the Galerkin method or Rayleigh-Ritz method to find approximate solutions of partial differential equations modeling vibrations of structures such as strings and plates; the paper of Courant (1943)  is fundamental. The Finite element method is a widespread particular case.

In classical mechanics, we may find generalized eigenvalues when we look for vibrations of multiple degrees of freedom systems close to equilibrium; the kinetic energy provides the mass matrix , the potential strain energy provides the rigidity matrix . To get details, for example see the first section of this article of Weinstein (1941, in French).

With both methods, we obtain a system of differential equations or Matrix differential equation with the mass matrix , the damping matrix and the rigidity matrix . If we neglect the damping effect, we use , we can look for a solution of the following form ; we obtain that and are solution of the generalized eigenvalue problem

Setting of perturbation for a generalized eigenvalue problem

Suppose we have solutions to the generalized eigenvalue problem,

where and are matrices. That is, we know the eigenvalues λ0i and eigenvectors x0i for i = 1, ..., N. It is also required that the eigenvalues are distinct.

Now suppose we want to change the matrices by a small amount. That is, we want to find the eigenvalues and eigenvectors of

where

with the perturbations and much smaller than and respectively. Then we expect the new eigenvalues and eigenvectors to be similar to the original, plus small perturbations:

Steps

We assume that the matrices are symmetric and positive definite, and assume we have scaled the eigenvectors such that

where δij is the Kronecker delta. Now we want to solve the equation

In this article we restrict the study to first order perturbation.

First order expansion of the equation

Substituting in (1), we get

which expands to

Canceling from (0) () leaves

Removing the higher-order terms, this simplifies to

In other words, no longer denotes the exact variation of the eigenvalue but its first order approximation.

As the matrix is symmetric, the unperturbed eigenvectors are orthogonal and so we use them as a basis for the perturbed eigenvectors. That is, we want to construct

with ,

where the εij are small constants that are to be determined.

In the same way, substituting in (2), and removing higher order terms, we get

The derivation can go on with two forks.

First fork: get first eigenvalue perturbation

Eigenvalue perturbation
We start with (3)

we left multiply with and use (2) as well as its first order variation (5); we get

or

We notice that it is the first order perturbation of the generalized Rayleigh quotient with fixed :

Moreover, for , the formula should be compared with Bauer-Fike theorem which provides a bound for eigenvalue perturbation.

Eigenvector perturbation

We left multiply (3) with for and get

We use for .

or

As the eigenvalues are assumed to be simple, for

Moreover (5) (the first order variation of (2) ) yields We have obtained all the components of .

Second fork: Straightforward manipulations

Substituting (4) into (3) and rearranging gives

Because the eigenvectors are M0-orthogonal when M0 is positive definite, we can remove the summations by left-multiplying by :

By use of equation (1) again:

The two terms containing εii are equal because left-multiplying (1) by gives

Canceling those terms in (6) leaves

Rearranging gives

But by (2), this denominator is equal to 1. Thus

Then, as for (assumption simple eigenvalues) by left-multiplying equation (5) by :

Or by changing the name of the indices:

To find εii, use the fact that:

implies:

Summary of the first order perturbation result

In the case where all the matrices are Hermitian positive definite and all the eigenvalues are distinct,

for infinitesimal and (the higher order terms in (3) being neglected).

So far, we have not proved that these higher order terms may be neglected. This point may be derived using the implicit function theorem; in next section, we summarize the use of this theorem in order to obtain a first order expansion.

Theoretical derivation

Perturbation of an implicit function.

In the next paragraph, we shall use the Implicit function theorem (Statement of the theorem ); we notice that for a continuously differentiable function , with an invertible Jacobian matrix , from a point solution of , we get solutions of with close to in the form where is a continuously differentiable function ; moreover the Jacobian marix of is provided by the linear system

.

As soon as the hypothesis of the theorem is satisfied, the Jacobian matrix of may be computed with a first order expansion of , we get

; as , it is equivalent to equation .

Eigenvalue perturbation: a theoretical basis.

We use the previous paragraph (Perturbation of an implicit function) with somewhat different notations suited to eigenvalue perturbation; we introduce , with

  • with

. In order to use the Implicit function theorem, we study the invertibility of the Jacobian with

. Indeed, the solution of

may be derived with computations similar to the derivation of the expansion.


When is a simple eigenvalue, as the eigenvectors form an orthonormal basis, for any right-hand side, we have obtained one solution therefore, the Jacobian is invertible.

The implicit function theorem provides a continuously differentiable function hence the expansion with little o notation: . with

This is the first order expansion of the perturbed eigenvalues and eigenvectors. which is proved.

Results of sensitivity analysis with respect to the entries of the matrices

The results

This means it is possible to efficiently do a sensitivity analysis on λi as a function of changes in the entries of the matrices. (Recall that the matrices are symmetric and so changing Kk will also change Kk, hence the (2 − δk) term.)

Similarly

Eigenvalue sensitivity, a small example

A simple case is ; however you can compute eigenvalues and eigenvectors with the help of online tools such as (see introduction in Wikipedia WIMS) or using Sage SageMath. You get the smallest eigenvalue and an explicit computation ; more over, an associated eigenvector is ; it is not an unitary vector; so ; we get and  ; hence ; for this example , we have checked that or .

Existence of eigenvectors

Note that in the above example we assumed that both the unperturbed and the perturbed systems involved symmetric matrices, which guaranteed the existence of linearly independent eigenvectors. An eigenvalue problem involving non-symmetric matrices is not guaranteed to have linearly independent eigenvectors, though a sufficient condition is that and be simultaneously diagonalizable.

The case of repeated eigenvalues

A technical report of Rellich  for perturbation of eigenvalue problems provides several examples. The elementary examples are in chapter 2. The report may be downloaded from archive.org. We draw an example in which the eigenvectors have a nasty behavior.

Example 1

Consider the following matrix and For , the matrix has eigenvectors belonging to eigenvalues . Since for if are any normalized eigenvectors belonging to respectively then where are real for It is obviously impossible to define , say, in such a way that tends to a limit as because has no limit as

Note in this example that is not only continuous but also has continuous derivatives of all orders. Rellich draws the following important consequence. << Since in general the individual eigenvectors do not depend continuously on the perturbation parameter even though the operator does, it is necessary to work, not with an eigenvector, but rather with the space spanned by all the eigenvectors belonging to the same eigenvalue. >>

Example 2

This example is less nasty that the previous one. Suppose is the 2x2 identity matrix, any vector is an eigenvector; then is one possible eigenvector. But if one makes a small perturbation, such as

Then the eigenvectors are and ; they are constant with respect to so that is constant and does not go to zero.

Representation of a Lie group

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