6533b85efe1ef96bd12bf300
RESEARCH PRODUCT
Purification of Lindblad dynamics, geometry of mixed states and geometric phases
David Viennotsubject
Partial traceQuantum information[PHYS.MPHY]Physics [physics]/Mathematical Physics [math-ph]FOS: Physical sciencesGeneral Physics and AstronomyGeometry01 natural sciencessymbols.namesakeOpen quantum system0103 physical sciencesGauge theory0101 mathematicsQuantum information010306 general physicsAdiabatic processNonlinear Schrödinger equationMathematical PhysicsMathematicsQuantum PhysicsLindblad equation010102 general mathematicsFibre bundlesHilbert spaceCategoryMathematical Physics (math-ph)Quantum PhysicsMathematics::Spectral TheoryGeometric phasesDynamics of open quantum systemsMixed statessymbolsGeometry and TopologyQuantum Physics (quant-ph)description
We propose a nonlinear Schr\"odinger equation in a Hilbert space enlarged with an ancilla such that the partial trace of its solution obeys to the Lindblad equation of an open quantum system. The dynamics involved by this nonlinear Schr\"odinger equation constitutes then a purification of the Lindbladian dynamics. This nonlinear equation is compared with other Schr\"odinger like equations appearing in the theory of open systems. We study the (non adiabatic) geometric phases involved by this purification and show that our theory unifies several definitions of geometric phases for open systems which have been previously proposed. We study the geometry involved by this purification and show that it is a complicated geometric structure related to an higher gauge theory, i.e. a categorical bibundle with a connective structure.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2015-08-10 |