Unitary transformation

Template:Short description Template:Use American English Script error: No such module "other uses". Script error: No such module "Unsubst". In mathematics, a unitary transformation is a linear isomorphism that preserves the inner product: the inner product of two vectors before the transformation is equal to their inner product after the transformation.^[1]

Formal definition

More precisely, a unitary transformation is an isometric isomorphism between two inner product spaces (such as Hilbert spaces). In other words, a unitary transformation is a bijective function

${\displaystyle U:H_1\to H_2}$

between two inner product spaces, ${\displaystyle H_1}$ and ${\displaystyle H_2,}$ such that

${\displaystyle ⟨Ux,Uy{⟩}_{H_2}=⟨x,y{⟩}_{H_1}\text{ for all }x,y\in H_1.}$

It is a linear isometry, as one can see by setting ${\displaystyle x=y.}$

Unitary operator

In the case when ${\displaystyle H_1}$ and ${\displaystyle H_2}$ are the same space, a unitary transformation is an automorphism of that Hilbert space, and then it is also called a unitary operator.

Antiunitary transformation

A closely related notion is that of antiunitary transformation, which is a bijective function

${\displaystyle U:H_1\to H_2}$

between two complex Hilbert spaces such that

${\displaystyle ⟨Ux,Uy⟩=\overline{⟨x,y⟩}=⟨y,x⟩}$

for all ${\displaystyle x}$ and ${\displaystyle y}$ in ${\displaystyle H_1}$, where the horizontal bar represents the complex conjugate.

See also

• Antiunitary
• Orthogonal transformation
• Time reversal
• Unitary group
• Unitary operator
• Unitary matrix
• Wigner's theorem
• Unitary transformations in quantum mechanics

References

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