Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

MATRICES AND VECTOR SPACES


Hence〈y|y〉=〈x|x〉, showing that the action of the linear operator represented by


a unitary matrix does not change the norm of a complex vector. The action of a


unitary matrix on a complex column matrix thus parallels that of an orthogonal


matrix acting on a real column matrix.


8.12.7 Normal matrices

A final important set of special matrices consists of thenormalmatrices, for which


AA†=A†A,

i.e. a normal matrix is one that commutes with its Hermitian conjugate.


We can easily show that Hermitian matrices and unitary matrices (or symmetric

matrices and orthogonal matrices in the real case) are examples of normal


matrices. For an Hermitian matrix,A=A†and so


AA†=AA=A†A.

Similarly, for a unitary matrix,A−^1 =A†and so


AA†=AA−^1 =A−^1 A=A†A.

Finally, we note that, ifAis normal then so too is its inverseA−^1 ,since


A−^1 (A−^1 )†=A−^1 (A†)−^1 =(A†A)−^1 =(AA†)−^1 =(A†)−^1 A−^1 =(A−^1 )†A−^1.

This broad class of matrices is important in the discussion of eigenvectors and

eigenvalues in the next section.


8.13 Eigenvectors and eigenvalues

Suppose that a linear operatorA transforms vectorsxin anN-dimensional


vector space into other vectorsAxin the same space. The possibility then arises


that there exist vectorsxeach of which is transformed byAinto a multiple of


itself. Such vectors would have to satisfy


Ax=λx. (8.67)

Any non-zero vectorxthat satisfies (8.67) for some value ofλis called an


eigenvectorof the linear operatorA,andλis called the correspondingeigenvalue.


As will be discussed below, in general the operatorA hasN independent


eigenvectorsxi, with eigenvaluesλi.Theλiare not necessarily all distinct.


If we choose a particular basis in the vector space, we can write (8.67) in terms

of the components ofAandxwith respect to this basis as the matrix equation


Ax=λx, (8.68)

whereAis anN×Nmatrix. The column matricesxthat satisfy (8.68) obviously

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