Proves quantitative trace-norm propagation of chaos for Belavkin equations on mixed-state density matrices in finite-dimensional quantum mean-field systems.
Spohn, Kinetic equations from Hamiltonian dynamics: Markovian li mits, Rev
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Establishes correspondence between equilibrium Majorana zero modes and non-equilibrium kinetic zero modes in dissipative topological superconductors, derives algebraic relation for their numbers, and proposes dissipation engineering recipes demonstrated on Kitaev chain.
A literature review synthesizing developments in quantum Wasserstein distances, their applications, and unresolved questions.
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Propagation of chaos for Belavkin equations beyond pure states
Proves quantitative trace-norm propagation of chaos for Belavkin equations on mixed-state density matrices in finite-dimensional quantum mean-field systems.
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Dissipation-Induced Steady States in Topological Superconductors: Mechanisms and Design Principles
Establishes correspondence between equilibrium Majorana zero modes and non-equilibrium kinetic zero modes in dissipative topological superconductors, derives algebraic relation for their numbers, and proposes dissipation engineering recipes demonstrated on Kitaev chain.
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Wasserstein Distances on Quantum Structures: an Overview
A literature review synthesizing developments in quantum Wasserstein distances, their applications, and unresolved questions.