In the fractional-time Jaynes-Cummings model, a transition at fractional order 0.5 replaces collapse-revival dynamics with periodic evolution, enhancing sub-Poissonian statistics, quadrature squeezing, and Schrödinger cat states.
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Kandel-Domany cluster dynamics with optimized long-range plaquette decompositions efficiently samples the frustrated Ising representation of two antiferromagnetically coupled Ohmic dissipative qubits.
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Fractional-Time Jaynes-Cummings Model: Unitary Description of its Quantum Dynamics, Inverse Problem and Photon Statistics
In the fractional-time Jaynes-Cummings model, a transition at fractional order 0.5 replaces collapse-revival dynamics with periodic evolution, enhancing sub-Poissonian statistics, quadrature squeezing, and Schrödinger cat states.
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Efficient simulation of a pair of dissipative qubits antiferromagnetically coupled
Kandel-Domany cluster dynamics with optimized long-range plaquette decompositions efficiently samples the frustrated Ising representation of two antiferromagnetically coupled Ohmic dissipative qubits.