A single-mode quantum transport in serial-structure geometric scatterers
Abstract
We study transport in quantum systems consisting of a finite array of N identical single-channel scatterers. A general expression of the S matrix in terms of the individual-element data obtained recently for potential scattering is rederived in this wider context. It shows in particular how the band spectrum of the infinite periodic system arises in the limit . We illustrate the result on two kinds of examples. The first are serial graphs obtained by chaining loops or T-junctions. A detailed discussion is presented for a finite-periodic "comb"; we show how the resonance poles can be computed within the Krein formula approach. Another example concerns geometric scatterers where the individual element consists of a surface with a pair of leads; we show that apart of the resonances coming from the decoupled-surface eigenvalues such scatterers exhibit the high-energy behavior typical for the delta' interaction for the physically interesting couplings.
Cite
@article{arxiv.quant-ph/0103094,
title = {A single-mode quantum transport in serial-structure geometric scatterers},
author = {Pavel Exner and Milos Tater and David Vanek},
journal= {arXiv preprint arXiv:quant-ph/0103094},
year = {2007}
}
Comments
36 pages, a LaTeX source file with 2 TeX drawings, 3 ps and 3 jpeg figures attached