Magnetotransport properties of the α-T3 model

Abstract

Using the well-known Kubo formula, we evaluate magnetotransport quantities like the collisional and Hall conductivities of the α-T3 model. The collisional conductivity exhibits a series of peaks at strong magnetic field. Each of the conductivity peaks for α=0 (graphene) splits into two in presence of a finite α. This splitting occurs due to a finite phase difference between the contributions coming from the two valleys. The density of states is also calculated to explore the origin of the splitting of conductivity peaks. As α approaches 1, the right split part of the conductivity peak comes closer to the left split part of the next conductivity peak. At α=1, they merge with each other to produce a new series of the conductivity peaks. On the other hand, the Hall conductivity undergoes a smooth transition from σyx=2(2n+1)e2/h to σyx=4ne2/h with n=0,1,2,... as we tune α from 0 to 1. For intermediate α, we obtain the Hall plateaus at values 0,2,4,6,8,... in units of e2/h.