The Kubo formula for the conductance of a mesoscopic system is analyzed semiclassically, yielding simple expressions for both weak localization and universal conductance fluctuations. In contrast to earlier work that dealt with times shorter than O(ln${\mathrm{ħ}}^{\mathrm{-}1}$), here longer times are taken to give the dominant contributions. For such long times, many distinct classical orbits may obey essentially the same initial and final conditions on positions and momenta, and the interference between pairs of such orbits is analyzed. Application to a chain of k classically ergodic scatterers connected in series gives -1/3[1-(k+1${)}^{\mathrm{-}2}$] for the weak localization correction to the zero-temperature dimensionless conductance, and 2/15[1-(k+1${)}^{\mathrm{-}4}$] for the variance of its fluctuations. These results interpolate between the well-known ones of random scattering matrices for k=1, and those of the one-dimensional diffusive wire for k→∞. © 1996 The American Physical Society.

• Received 12 May 1995

DOI:https://doi.org/10.1103/PhysRevB.53.7035