Begin2.DVI

Matrices with Special Properties

The following is some terminology associated with square matrices Aand B.

(1) If AB =−BA, then Aand Bare called anticommutative.

(2) If AB =BA, then Aand Bare called commutative.

(3) If AB
=BA, then Aand Bare called noncommutative.

(4) If Ap=

︷p times︸︸ ︷

AA ···A= ̃ 0 for some positive integer p,

then Ais called nilpotent of order p.

(5) If A^2 =A, then Ais called idempotent.

(6) If A^2 =I, then Ais called involutory.

(7) If Ap+1 =A, then Ais called periodic with period p. The smallest

integer pfor which Ap+1 =Ais called the least period p.

(8) If AT=A, then Ais called a symmetric matrix.

(9) If AT=−A, then Ais called a skew-symmetric matrix.

(10) If A−^1 exists, then Ais called a nonsingular matrix.

(11) If A−^1 does not exist, then Ais called a singular matrix.

(12) If ATA=AA T=I, then Ais called an orthogonal matrix and AT=A−^1.

Example 10-6.

The matrix A=

[

0 0

− 1 − 1

]

is periodic with least period 2 because

A^2 =AA =

[

0 0

− 1 − 1

][

0 0

− 1 − 1

]

=

[

0 0

1 1

]

and A^3 =A^2 A=

[

0 0

1 1

][

0 0

− 1 − 1

]

=A

Example 10-7. The matrix A=

[

− 1 − 1

1 1

]

is nilpotent of index 2 because

A^2 =AA =

[

− 1 − 1

1 1

][

− 1 − 1

1 1

]

=

[

0 0

0 0

]

= ̃ 0

Example 10-8. The matrix

B=

[

− 1 − 1

2 2

]

is idempotent because

B^2 =BB =

[

− 1 − 1

2 2

][

− 1 − 1

2 2

]

=

[

− 1 − 1

2 2

]

=B