中文

Monitored quantum transport through a disordered one-dimensional conductor

介观与纳米尺度物理 2026-05-22 v1

摘要

We formulate a quantum master equation for the many-particle density matrix of electrons propagating through a single-mode conductor, combining elastic scattering by disorder with time-resolved projective measurements that monitor the outcome of scattering events. The full counting statistics of transmitted electrons has a binomial distribution function, whose mean T{\cal T} and variance T(1T){\cal T}(1-{\cal T}) determine the conductance and shot noise power, respectively. Monitoring suppresses the phase coherence responsible for one-dimensional localization: The decay with conductor length LL of the typical transmission probability crosses over at LϕL\simeq \ell_\phi from the exponential eL/ξe^{-L/\xi} (with localization length ξ\xi) to the Ohmic 1/L1/L decay. Numerical solution of the master equation gives, for weak monitoring, a logarithmic dependence ϕξln(vFτϕ/ξ)\ell_\phi\simeq \xi\ln(v_{\rm F}\tau_\phi/\xi) of the coherence length ϕ\ell_\phi on the mean time τϕ\tau_\phi between measurements.

关键词

引用

@article{arxiv.2605.22701,
  title  = {Monitored quantum transport through a disordered one-dimensional conductor},
  author = {J. Sánchez Fernán and J. Tworzydło and C. W. J. Beenakker},
  journal= {arXiv preprint arXiv:2605.22701},
  year   = {2026}
}

备注

12 pages, 7 figures