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In mathematics, a unitary matrix is a n by
n complex matrix U satisfying the condition
- U*U = UU* = In
where In is the identity matrix and
U* is the conjugate transpose (also
called the Hermitian adjoint) of U. Note this condition says that a matrix U is unitary if it has an inverse which is equal to its conjugate transpose U*.
A unitary matrix in which all entries are real is the same thing as an orthogonal matrix. Just as an orthogonal matrix G preserves the (real) inner product of two real vectors,
-
so also a unitary matrix U satisfies
-
for all complex vectors x and y, where <.,.> stands now for the standard inner product on Cn. A matrix is unitary if
and only if its columns form an orthonormal basis of
Cn with respect to this inner product.
All eigenvalues of a unitary matrix are complex numbers of absolute value 1 (i.e. they lie on the unit circle centered at 0 in the complex plane). The
same is true for the determinant.
All unitary matrices are normal, and the spectral theorem therefore applies to them.
See also: orthogonal matrix, symplectic matrix, unitary group, unitary operator
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