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Locality Bound for Dissipative Quantum Transport

Quantum Physics 2018-10-31 v2 Statistical Mechanics High Energy Physics - Theory Mathematical Physics math.MP

Abstract

We prove an upper bound on the diffusivity of a general local and translation invariant quantum Markovian spin system: DD0+(αvLRτ+βξ)vCD \leq D_0 + \left(\alpha \, v_\text{LR} \tau + \beta \, \xi \right) v_\text{C}. Here vLRv_\text{LR} is the Lieb-Robinson velocity, vCv_\text{C} is a velocity defined by the current operator, τ\tau is the decoherence time, ξ\xi is the range of interactions, D0D_0 is a microscopically determined diffusivity and α\alpha and β\beta are precisely defined dimensionless coefficients. The bound constrains quantum transport by quantities that can either be obtained from the microscopic interactions (D0,vLR,vC,ξD_0, v_\text{LR}, v_\text{C},\xi) or else determined from independent local non-transport measurements (τ,α,β\tau,\alpha,\beta). We illustrate the general result with the case of a spin half XXZ chain with on-site dephasing. Our result generalizes the Lieb-Robinson bound to constrain the sub-ballistic diffusion of conserved densities in a dissipative setting.

Keywords

Cite

@article{arxiv.1806.01859,
  title  = {Locality Bound for Dissipative Quantum Transport},
  author = {Xizhi Han and Sean A. Hartnoll},
  journal= {arXiv preprint arXiv:1806.01859},
  year   = {2018}
}

Comments

5 pages, 1 figure, revised for PRL

R2 v1 2026-06-23T02:20:09.906Z