E. Bascones, G. Gomez-Santos, J. J. Saenz
Published 1997-11-27Version 1
Recent experiments on atomic-scale metallic contacts have shown that the quantization of the conductance appears clearly only after the average of the experimental results. Motivated by these results we have analyzed a simplified model system in which a narrow neck is randomly coupled to wide ideal leads, both in absence and presence of time reversal invariance. Based on Random Matrix Theory we study analytically the probability distribution for the conductance of such system. As the width of the leads increases the distribution for the conductance becomes sharply peaked close to an integer multiple of the quantum of conductance. Our results suggest a possible statistical origin of conductance quantization in atomic-scale metallic contacts.
Comments: 4 pages, Tex and 3 figures. To be published in PRB
Conductance Quantization and Electron Resonances in Sharp Tips and Atomic-Size Contacts
Random matrix theory of quantum transport in chaotic cavities with non-ideal leads
Applications of random matrix theory to condensed matter and optical physics
