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In mathematics, the unitary group of degree n over the field F (which is either the field R of real numbers or the field C of complex numbers) is the group of n by n unitary matrices with entries from F, with the group operation that of matrix multiplication. This is a subgroup of the general linear group Gl(n,F).
In the simple case n = 1, the group U(1) is the unit circle in the complex plane, under multiplication. All the complex unitary groups contain copies of this group.
If the field F is the field of real numbers then the unitary group coincides with the orthogonal group O(n,R). If F is the field of complex numbers one usually writes U(n) for the unitary group of degree n.
The unitary group U(n) is a real Lie group of dimension n2. The Lie algebra of U(n) consists of complex n-by-n Skew-hermitian matrices, with the Lie bracketA lie bracket can refer to: Lie algebra Lie derivative. given by the commutatorFor an electrical switch that periodically reverses the current see commutator (electric In mathematics the commutator of two elements g and h of a group G is the element g −1 h −1 gh often denoted by [ g h ]. It is equal to the group's identi.
See also: Special unitary groupIn mathematics, the special unitary group of degree n is the group of n by n unitary matrices with determinant 1 and entries from the field C of complex numbers, with the group operation that of matrix multiplication. It is written as SU n . This is a sub