Edge state transmission, duality relation and its implication to measurements
Abstract
The duality in the Chalker-Coddington network model is examined. We are able to write down a duality relation for the edge state transmission coefficient, but only for a specific symmetric Hall geometry. Looking for broader implication of the duality, we calculate the transmission coefficient T in terms of the conductivity σxx and σxy in the diffusive limit. The edge state scattering problem is reduced to solving the diffusion equation with two boundary conditions (∂y-(σxy)/(σxx)∂x)φ=0 and [∂x+(σxy-σxylead)/(σxx) ∂y]φ=0. We find that the resistances in the geometry considered are not necessarily measures of the resistivity and xx=L/W R/T h/e2 (R=1-T) holds only when xy is quantized. We conclude that duality alone is not sufficient to explain the experimental findings of Shahar et al and that Landauer-Buttiker argument does not render the additional condition, contrary to previous expectation.
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