📝 SummarXiv

Abstract

By a simulation study of three-dimensional (3D) and two-dimensional (2D) disordered lattice models in the chiral symplectic class, we show that one-dimensional (1D) weak topology universally induces an intermediate quasi-localized (QL) phase between metal and Anderson-localized phases, in which the localization length of wave functions is divergent only along the spatial direction associated with the weak topological index. Our numerical evaluation of the critical exponents of the metal-to-QL transition and the Anderson transition (in the absence of the weak topology) demonstrates that they belong to different universality classes. We also confirm that the critical exponents of these two transitions in the chiral symplectic class significantly differ from those in the chiral unitary and chiral orthogonal classes, highlighting the impact of Kramers time-reversal symmetry on quantum critical behavior.