A new duality operator using generalized matrix product operators maps out-of-equilibrium boundaries in the symmetric simple exclusion process to equilibrium boundaries satisfying Liggett's condition.
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In Markovian open quantum systems with bistability, noise-induced stochastic switching limits relaxation and follows an Arrhenius law with inverse system size as effective temperature, distinct from deterministic slow relaxation due to a small Liouvillian gap.
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Intertwining Markov Processes via Matrix Product Operators
A new duality operator using generalized matrix product operators maps out-of-equilibrium boundaries in the symmetric simple exclusion process to equilibrium boundaries satisfying Liggett's condition.
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Switching Dynamics of Metastable Open Quantum Systems
In Markovian open quantum systems with bistability, noise-induced stochastic switching limits relaxation and follows an Arrhenius law with inverse system size as effective temperature, distinct from deterministic slow relaxation due to a small Liouvillian gap.