Mathematical Methods for Physics and Engineering : A Comprehensive Guide

8.16 DIAGONALISATION OF MATRICES

Diagonalise the matrix

A=





103

0 − 20

301



.

The matrixAis symmetric and so may be diagonalised by a transformation of the form
A′=S†AS,whereShas the normalised eigenvectors ofAas its columns. We have already
found these eigenvectors in subsection 8.14.1, and so we can write straightaway

S=

1

√

2





10 − 1

0

√

20

10 1



.

We note that although the eigenvalues ofAare degenerate, its three eigenvectors are
linearly independent and soAcan still be diagonalised. Thus, calculatingS†ASwe obtain

S†AS=

1

2





101

0

√

20

− 101









103

0 − 20

301









10 − 1

0

√

20

10 1





=





40 0

0 − 20

00 − 2



,

which is diagonal, as required, and has as its diagonal elements the eigenvalues ofA.

If a matrixAis diagonalised by the similarity transformationA′=S−^1 AS,so

thatA′= diag(λ 1 ,λ 2 ,...,λN), then we have immediately

TrA′=TrA=

∑N

i=1

λi, (8.102)

|A′|=|A|=

∏N

i=1

λi, (8.103)

since the eigenvalues of the matrix are unchanged by the transformation. More-

over, these results may be used to prove the rather usefultrace formula

|expA|= exp(TrA), (8.104)

where the exponential of a matrix is as defined in (8.38).

Prove the trace formula (8.104).

At the outset, we note that for the similarity transformationA′=S−^1 AS, we have

(A′)n=(S−^1 AS)(S−^1 AS)···(S−^1 AS)=S−^1 AnS.

Thus, from (8.38), we obtain expA′=S−^1 (expA)S, from which it follows that|expA′|=