Exponentially small quantum correction to conductance

Abstract

When time-reversal symmetry is broken, the average conductance through a chaotic cavity, from an entrance lead with N1 open channels to an exit lead with N2 open channels, is given by N1N2/M, where M=N1+N2. We show that, when tunnel barriers of reflectivity γ are placed on the leads, two correction terms appear in the average conductance, and that one of them is proportional to γM. Since M -1, this correction is exponentially small in the semiclassical limit. Surprisingly, we derive this term from a semiclassical approximation, generally expected to give only leading orders in powers of . Even though the theory is built perturbatively both in γ and in 1/M, the final result is exact.