Braiding of anyonic quasiparticles in the charge transfer statistics of symmetric fractional edge-state Mach-Zehnder interferometer

TL;DR

This paper investigates the charge transfer statistics in a symmetric fractional quantum Hall Mach-Zehnder interferometer, revealing how quasiparticle braiding influences tunneling behavior and noise characteristics.

Contribution

It provides a general expression for the cumulant generating function and links the large-voltage asymptotics to quasiparticle transitions, highlighting fractional charge and statistics effects.

Findings

Derived the cumulant generating function for charge transfer.

Connected large-voltage behavior to quasiparticle transition dynamics.

Calculated explicit shot noise and skewness expressions.

Abstract

We have studied the zero-temperature statistics of the charge transfer between the two edges of Quantum Hall liquids of, in general, different filling factors, $\nu_{0,1}=1/(2 m_{0,1}+1)$, with $m_0 \geq m_1\geq 0$, forming Mach-Zehnder interferometer. General expression for the cumulant generating function in the large-time limit is obtained for symmetric interferometer with equal propagation times along the two edges between the contacts and constant bias voltage. The low-voltage limit of the generating function can be interpreted in terms of the regular Poisson process of electron tunneling, while its leading large-voltage asymptotics is proven to coincide with the solution of kinetic equation describing quasiparticle transitions between the $m$ states of the interferometer with different effective flux through it, where $m\equiv 1+m_{0}+m_{1}$. For $m>1$, this dynamics reflects both the fractional charge $e/m$ and the fractional statistical angle $\pi /m$ of the tunneling quasiparticles. Explicit expressions for the second (shot noise) and third cumulants are obtained, and their voltage dependence is analyzed.