Hermitian conjugation.
General Hermitian conjugate operation.
Take the Hermetian conjugate of an argument [R284]. For matrices this operation is equivalent to transpose and complex conjugate [R285].
Parameters : | arg : Expr
|
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References
[R284] | (1, 2) http://en.wikipedia.org/wiki/Hermitian_adjoint |
[R285] | (1, 2) http://en.wikipedia.org/wiki/Hermitian_transpose |
Examples
Daggering various quantum objects:
>>> from sympy.physics.quantum.dagger import Dagger
>>> from sympy.physics.quantum.state import Ket, Bra
>>> from sympy.physics.quantum.operator import Operator
>>> Dagger(Ket('psi'))
<psi|
>>> Dagger(Bra('phi'))
|phi>
>>> Dagger(Operator('A'))
Dagger(A)
Inner and outer products:
>>> from sympy.physics.quantum import InnerProduct, OuterProduct
>>> Dagger(InnerProduct(Bra('a'), Ket('b')))
<b|a>
>>> Dagger(OuterProduct(Ket('a'), Bra('b')))
|b><a|
Powers, sums and products:
>>> A = Operator('A')
>>> B = Operator('B')
>>> Dagger(A*B)
Dagger(B)*Dagger(A)
>>> Dagger(A+B)
Dagger(A) + Dagger(B)
>>> Dagger(A**2)
Dagger(A)**2
Dagger also seamlessly handles complex numbers and matrices:
>>> from sympy import Matrix, I
>>> m = Matrix([[1,I],[2,I]])
>>> m
Matrix([
[1, I],
[2, I]])
>>> Dagger(m)
Matrix([
[ 1, 2],
[-I, -I]])