Localization transition in one dimension using Wegner flow equations

Abstract

The flow-equation method was proposed by Wegner as a technique for studying interacting systems in one dimension. Here, we apply this method to a disordered one-dimensional model with power-law decaying hoppings. This model presents a transition as function of the decaying exponent α. We derive the flow equations and the evolution of single-particle operators. The flow equation reveals the delocalized nature of the states for α<12. Additionally, in the regime α>12, we present a strong-bond renormalization group structure based on iterating the three-site clusters, where we solve the flow equations perturbatively. This renormalization group approach allows us to probe the critical point (α=1). This method correctly reproduces the critical level-spacing statistics and the fractal dimensionality of the eigenfunctions.

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