Noise and Full Counting Statistics of Incoherent Multiple Andreev Reflection

Abstract

We present a general theory for the full counting statistics of multiple Andreev reflections in incoherent superconducting-normal-superconducting contacts. The theory, based on a stochastic path integral approach, is applied to a superconductor-double barrier system. It is found that all cumulants of the current show a pronounced subharmonic gap structure at voltages V=2/en. For low voltages V/e, the counting statistics results from diffusion of multiple charges in energy space, giving the pth cumulant <Qp> V2-p, diverging for p≥ 3. We show that this low-voltage result holds for a large class of incoherent superconducting-normal-superconducting contacts.

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