English

Adiabaticity in open quantum systems

Quantum Physics 2016-03-21 v2

Abstract

We provide a rigorous generalization of the quantum adiabatic theorem for open systems described by a Markovian master equation with time-dependent Liouvillian L(t)\mathcal{L}(t). We focus on the finite system case relevant for adiabatic quantum computing and quantum annealing. Adiabaticity is defined in terms of closeness to the instantaneous steady state. While the general result is conceptually similar to the closed system case, there are important differences. Namely, a system initialized in the zero-eigenvalue eigenspace of L(t)\mathcal{L}(t) will remain in this eigenspace with a deviation that is inversely proportional to the total evolution time TT. In the case of a finite number of level crossings the scaling becomes TηT^{-\eta} with an exponent η\eta that we relate to the rate of the gap closing. For master equations that describe relaxation to thermal equilibrium, we show that the evolution time TT should be long compared to the corresponding minimum inverse gap squared of L(t)\mathcal{L}(t). Our results are illustrated with several examples.

Keywords

Cite

@article{arxiv.1508.05558,
  title  = {Adiabaticity in open quantum systems},
  author = {Lorenzo Campos Venuti and Tameem Albash and Daniel A. Lidar and Paolo Zanardi},
  journal= {arXiv preprint arXiv:1508.05558},
  year   = {2016}
}

Comments

v2: 12 pages, 2 figures. Updated to published version

R2 v1 2026-06-22T10:39:32.810Z