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Quantum Simulation
Stabilizing Non-Hermitian Systems by Periodic Driving
arXiv
Authors: Jiangbin Gong, Qing-hai Wang
Year
2014
Paper ID
45981
Status
Preprint
Abstract Read
~2 min
Abstract Words
138
Citations
N/A
Abstract
The time evolution of a system with a time-dependent non-Hermitian Hamiltonian is in general unstable with exponential growth or decay. A periodic driving field may stabilize the dynamics because the eigenphases of the associated Floquet operator may become all real. This possibility can emerge for a continuous range of system parameters with subtle domain boundaries. It is further shown that the issue of stability of a driven non-Hermitian Rabi model can be mapped onto the band structure problem of a class of lattice Hamiltonians. As an application, we show how to use the stability of driven non-Hermitian two-level systems (0-dimension in space) to simulate a spectrum analogous to Hofstadter's butterfly that has played a paradigmatic role in quantum Hall physics. The simulation of the band structure of non-Hermitian superlattice potentials with parity-time reversal symmetry is also briefly discussed.
Why This Paper Matters
- This paper contributes to the Quantum Simulation research area in the Quantum Articles archive.
- It adds a 2014 reference point for readers tracking recent quantum research.
- The time evolution of a system with a time-dependent non-Hermitian Hamiltonian is in general unstable with exponential growth or decay.
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