A dynamical invariant approach in hybrid systems generates cat states with >120 mean photons deterministically under Hermitian or non-Hermitian Hamiltonians, with fidelity >0.962 in the dissipative case.
From Liouville equation to universal quantum control: A study of generating ultra highly squeezed states
2 Pith papers cite this work. Polarity classification is still indexing.
abstract
Within a unified framework, we reveal that the seemingly disparate control approaches for classical and quantum continuous-variable systems are interconnected via differential manifolds of the ancillary representations. For classical systems, the ancillary representation is defined by the time-dependent ancillary canonical variables resulting from a symplectic transformation over the original canonical variables. Under the conditions of the Hamilton-Jacobi equation, the ancillary canonical variables act as dynamical invariants to guide the system nonadiabatically through the entire phase space. The second quantization of the Liouville equation for the canonical variables leads to the Heisenberg equation for the relevant ancillary operators, which is found to be a sufficient condition to yield nonadiabatic passages towards arbitrary target states in both Hermitian and non-Hermitian systems and constrained exact solutions of the time-dependent Schroedinger equation. Using the non-Hermitian Hamiltonian rigorously derived from the Lindblad master equation, our theory is exemplified by the generation of single-mode squeezed states with a squeezing level of 29.3 dB and double-mode squeezed states with 20.5 dB, respectively.
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Second quantization of the Liouville equation produces a Heisenberg equation for ancillary operators that suffices for nonadiabatic generation of ultra-highly squeezed states in Hermitian and non-Hermitian quantum systems.
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From Liouville equation to universal quantum control: A study of generating ultra highly squeezed states
Second quantization of the Liouville equation produces a Heisenberg equation for ancillary operators that suffices for nonadiabatic generation of ultra-highly squeezed states in Hermitian and non-Hermitian quantum systems.