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Mixing times and cutoffs in open quadratic fermionic systems

Eric Vernier

2020SciPost Physics37 citationsDOIOpen Access PDF

Abstract

In classical probability theory, the term cutoff describes the property of some Markov chains to jump from (close to) their initial configuration to (close to) completely mixed in a very narrow window of time. We investigate how coherent quantum evolution affects the mixing properties in two fermionic quantum models (the ``gain/loss'' and ``topological'' models), whose time evolution is governed by a Lindblad equation quadratic in fermionic operators, allowing for a straightforward exact solution. We check that the cutoff phenomenon extends to the quantum case and examine how the mixing properties depend on the initial state. In the topological case, we further show how the mixing properties are affected by the presence of a long-lived edge zero mode when taking open boundary conditions.

Topics & Concepts

Mixing (physics)Quadratic equationCutoffQuantumStatistical physicsPhysicsMaster equationBoundary (topology)Boundary value problemMathematicsQuantum mechanicsMathematical analysisGeometryQuantum many-body systemsQuantum Information and CryptographyQuantum Mechanics and Applications