Real-space renormalisation approach to the Chalker-Coddington model revisited: improved statistics

Abstract

The real-space renormalisation group method can be applied to the Chalker-Coddington model of the quantum Hall transition to provide a convenient numerical estimation of the localisation critical exponent, . Previous such studies found 2.39 which falls considerably short of the current best estimates by transfer matrix (≈ 2.593) and exact-diagonalisation studies (=2.58(3)). By increasing the amount of data 500 fold we can now measure closer to the critical point and find an improved estimate ≈ 2.51. This deviates only 3\% from the previous two values and is already better than the 7\% accuracy of the classical small-cell renormalisation approach from which our method is adapted. We also study a previously proposed mixing of the Chalker-Coddington model with a classical scattering model which is meant to provide a route to understanding why experimental estimates give a lower 2.3. Upon implementing this mixing into our RG unit, we find only further increases to the value of .