Unitary matrix
A square matrix $ A = \| a _ {ik} \| _ {1} ^ {n} $
over the field $ \mathbf C $
of complex numbers, whose rows form an orthonormal system, i.e.
$$ a _ {i1} \overline{a}\; _ {k1} + \dots + a _ {in} \overline{a}\; _ {kn} = \ \left \{
$ i, k = 1 \dots n $. In a unitary space, transformation from one orthonormal basis to another is accomplished by a unitary matrix. The matrix of a unitary transformation relative to an orthonormal basis is also (called) a unitary matrix. A square matrix $ A $ with complex entries is unitary if and only if it satisfies any of the following conditions:
1) $ A ^ {*} A = E $;
2) $ AA ^ {*} = E $;
3) $ A ^ {*} = A ^ {-} 1 $;
4) the columns of $ A $ form an orthonormal system (here $ A ^ {*} $ is the conjugate transposed of $ A $).
The determinant of a unitary matrix is a complex number of modulus one.
Comments
References
[a1] | W. Noll, "Finite dimensional spaces" , M. Nijhoff (1987) pp. 63 |
[a2] | W.H. Greub, "Linear algebra" , Springer (1975) pp. 329 |
Unitary matrix. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Unitary_matrix&oldid=13327