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arxiv: 2309.06258 · v2 · pith:BE2MKIWPnew · submitted 2023-09-12 · 🪐 quant-ph · cond-mat.stat-mech

Work Statistics and Adiabatic Assumption in Nonequilibrium Many-Body Theory

classification 🪐 quant-ph cond-mat.stat-mech
keywords adiabaticgibbsnonequilibriumtheoryaddressingassumptionscounterpartevolutions
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Keldysh field theory, based on adiabatic assumptions, serves as an widely used framework for addressing nonequilibrium many-body systems. Nonetheless, the validity of such adiabatic assumptions when addressing interacting Gibbs states remains a topic of contention. We use the knowledge of work statistics developed in nonequilibrium thermodynamics to study this problem. Consequently, we deduce a universal theorem delineating the characteristics of evolutions that transition an initial Gibbs state to another. Based on this theorem, we analytically ascertain that adiabatic evolutions fail to transition a non-interacting Gibbs state to its interacting counterpart. However, this adiabatic approach remains a superior approximation relative to its non-adiabatic counterpart. Numerics verifying our theory and predictions are also provided. Furthermore, our findings render insights into the preparation of Gibbs states within the domain of quantum computation.

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