- In physics, a
superoperator is a
linear operator acting on a
vector space of
linear operators.
Sometimes the term
refers more
specially to a completely...
- this reason, the
superoperator L {\displaystyle {\mathcal {L}}} is
called the
Lindbladian superoperator or the
Liouvillian superoperator. More generally...
- the
Liouvillian superoperator L ( t ) {\displaystyle \mathbf {L} \left(t\right)} is a sum of the
Hamiltonian commutation superoperator H ( t ) {\displaystyle...
-
product as any
other pair. In
using the SIC-POVM elements, an
interesting superoperator can be constructed, the
likes of
which map L ( H ) → L ( H ) {\displaystyle...
- meta-operator is
generally neither an
operator (a
linear transform on the
vector space) nor a
superoperator (a
linear transform on the
space of operators). v t e...
- operator",
strictly speaking it is
neither an
operator on
states nor a
superoperator on operators.) For two
operators A(x) and B(y) that
depend on spacetime...
-
correspondence between positive operators and the
complete positive superoperators.[citation needed] To
study a
quantum channel E {\displaystyle {\mathcal...
- completely-positive maps
should be
considered as well.
Quantum dynamical semigroup Superoperator Sudarshan, E. C. G.; Mathews, P. M.; Rau,
Jayaseetha (1961-02-01). "Stochastic...
-
solve for χ {\displaystyle \displaystyle \chi } ,
which is a
positive superoperator and
completely characterizes E {\displaystyle {\mathcal {E}}} with respect...
- semigroup. In some fields, such as
quantum optics, the term
Lindblad superoperator is
often used to
express the
quantum master equation for a dissipative...