Abstract
The effect of boundary conditions on the critical level statistics has been discussed recently. To clarify the effect of boundary conditions at the Anderson transition, we have performed a numerical finite-size scaling analysis with Dirichlet boundary conditions. By taking into account corrections to scaling due to the surface effect, we have succeeded in extracting estimates for the critical points and the critical exponents consistent with those obtained with periodic boundary conditions. The implication for the boundary condition dependence of critical level statistics and for critical conductance distributions is also discussed.
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