An exactly solvable absorbing quantum walk is introduced via a Lindblad sink, mapped to a non-Hermitian Hamiltonian, and solved to yield closed-form propagator, first-passage statistics, and a duality in asymptotic absorption probabilities.
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Proposes a scalable framework for quantum decision trees in a laser-driven four-level diamond atomic system using Lie-algebraic analysis and amplitude-varied pulses with identical temporal profiles for controlled population transfer.
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An Exactly Solvable Absorbing Quantum Walk
An exactly solvable absorbing quantum walk is introduced via a Lindblad sink, mapped to a non-Hermitian Hamiltonian, and solved to yield closed-form propagator, first-passage statistics, and a duality in asymptotic absorption probabilities.
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Towards a quantum decision tree in a laser pumped four-level system
Proposes a scalable framework for quantum decision trees in a laser-driven four-level diamond atomic system using Lie-algebraic analysis and amplitude-varied pulses with identical temporal profiles for controlled population transfer.