Authors: Kruglyak Yu.А., Kostritskya L.S.
Year: 2016
Issue: 20
Pages: 78-90
Abstract
The Landauer – Datta – Lundstrom transport model is used to calculate conductivity of resistors of any dimension and scale and of an arbitrary dispersion working in the ballistic or diffusion regime at near 0 K and at higher temperatures. There is also discussed still widely used concept of mobility, as well as the dissipation of heat and the voltage drop in the ballistic resistors.
The goal of this review is to show how to use the Landauer equation for conductance in the absence of temperature difference at the ends of the conductor.
The main results can be briefly formulated as follows: all conductors have a constant resistance even in case of absence of electron scattering. Ballistic resistance is the lower limit of resistance, no matter how small the conductor is. This ballistic limit resistance becomes important even for electronic devices at the room temperature. Ballistic resistance is quantized and the quantum of resistance is represented by fundamental Klitzing constant. The whole area of the transition from ballistic to diffusive transport is interpreted in the LDL model in a standard way with the help of transmission coefficient. Resistors of all dimensions – 1D, 2D and 3D are uniformly treated in the LDL formalism, and the interpretation allows for any type of dispersion relation. In the study of electrical properties of any new material, including nanosystems, it is necessary to begin with the Landauer conductivity equation.
Tags: elastic resistor fashion conductivity; Nanophysics and Nanoelectronics; transmittance
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