Al'tshuler-Aronov correction to the conductivity of a large metallic square network
arXiv:0704.0741 · doi:10.1103/PhysRevB.76.094202
Abstract
We consider the correction $ÎÏ_\mathrm{ee}$ due to electron-electron interaction to the conductivity of a weakly disordered metal (Al'tshuler-Aronov correction). The correction is related to the spectral determinant of the Laplace operator. The case of a large square metallic network is considered. The variation of $ÎÏ_\mathrm{ee}(L_T)$ as a function of the thermal length $L_T$ is found very similar to the variation of the weak localization $ÎÏ_\mathrm{WL}(L_Ï)$ as a function of the phase coherence length. Our result for $ÎÏ_\mathrm{ee}$ interpolates between the known 1d and 2d results, but the interaction parameter entering the expression of $ÎÏ_\mathrm{ee}$ keeps a 1d behaviour. Quite surprisingly, the result is very close to the 2d logarithmic behaviour already for $L_T\sim{a}/2$, where $a$ is the lattice parameter.
6 pages, RevTex4, 3 eps figures