Band-center metal-insulator transition in bond-disordered graphene

Abstract

We study the transport properties of a tight-binding model of non-interacting fermions with random hopping on the honeycomb lattice. At the particle-hole symmetric chemical potential, the absence of diagonal disorder (random onsite potentials) places the system in the well-studied chiral orthogonal universality class of disordered fermion problems, which are known to exhibit both a critical metallic phase and a dimerization-induced localized phase. Here, our focus is the behavior of the two-terminal conductance and the Lyapunov spectrum in quasi-1D geometry near the dimerization-driven transition from the metallic to the localized phase. For a staggered dimerization pattern on the square and honeycomb lattices, we find that the renormalized localization length /M (M denotes the width of the sample) and the typical conductance display scaling behavior controlled by a crossover length-scale that diverges with exponent ≈ 1.05(5) as the critical point is approached. However, for the plaquette dimerization pattern, we observe a relatively large exponent ≈ 1.55(5) revealing an apparent non-universality of the delocalization-localization transition in the BDI symmetry class.