Related papers: Localization via Quasi-Periodic Bulk-Bulk Correspondence

Localization via Quasi-Periodic Bulk-Bulk Correspondence

URL: http://arxiv.org/abs/2111.02789v2
Date: Fri, 5 Nov 2021 15:31:35 GMT
Title: Localization via Quasi-Periodic Bulk-Bulk Correspondence
Authors: Dan S. Borgnia, Robert-Jan Slager
Abstract summary: We report on a direct connection between quasi-periodic topology and the Almost Mathieu (Andre-Aubry) metal insulator transition (MIT) By constructing quasi-periodic transfer matrix equations from the limit of rational approximate projected Green's functions, we relate results from $textSL (2,mathbbR)$ co-cycle theory to consequences of rational band theory.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We report on a direct connection between quasi-periodic topology and the Almost Mathieu (Andre-Aubry) metal insulator transition (MIT). By constructing quasi-periodic transfer matrix equations from the limit of rational approximate projected Green's functions, we relate results from $\text{SL}(2,\mathbb{R})$ co-cycle theory (transfer matrix eigenvalue scaling) to consequences of rational band theory. This reduction links the eigenfunction localization of the MIT to the chiral edge modes of the Hofstadter Hamiltonian, implying the localized phase roots in a topological "bulk-bulk" correspondence, a bulk-boundary correspondence between the 1D AAH system (boundary) and its 2D parent Hamiltonian (bulk). This differentiates quasi-periodic localization from Anderson localization in disordered systems. Our results are widely applicable to systems beyond this paradigmatic model.

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