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Using a generalized Landauer approach we study the nonlinear transport in mesoscopic graphene with zigzag and armchair edges. We find that for clean systems, the low-bias low-temperature conductance, G, of an armchair edge system is quantized as G∕ \~{}t=4ne^2∕h, whereas for a zigzag edge the quantization changes to G∕ \~{}t=4 (n+1∕2) e^2∕h, where \~{}t is the transmission probability and n is an integer. We also study the effects of a nonzero bias, temperature, and magnetic field on the conductance. The magnetic field dependence of the quantization plateaus in these systems is somewhat different from the one found in the two-dimensional electron gas due to a different Landau level quantization.
Peres et al. (Fri,) studied this question.