Popis: |
We calculate the phase diagram of the Aubry-Andr\'{e} model as a function of filling and potential strength ($W$). We apply periodic boundary conditions and calculate the geometric Binder cumulant to determine the transition between the extended and localized phases. For rational fillings the phase transition occurs at $W=2t$ ($t$ denotes the hopping parameter), but spikes occur in the phase diagram at fillings which correspond to ratios of Fibonacci numbers. In the thermodynamic limit these ratios tend to specific irrational numbers, and $W \rightarrow 0$ at these fillings. We also calculate the phase diagram of an extended Aubry-Andr\'{e} model with second nearest neighbor hoppings. In addition to spikes, this phase diagram also exhibits discontinuities (jumps) at some of the irrational fillings at which the spikes occur. |