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Autori principali: Caragiulo, Fabrizio, Mastropietro, Vieri, Porta, Marcello
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2410.03946
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author Caragiulo, Fabrizio
Mastropietro, Vieri
Porta, Marcello
author_facet Caragiulo, Fabrizio
Mastropietro, Vieri
Porta, Marcello
contents We consider Haldane-like $2d$ topological insulators on the cylinder, in the presence of weak quasi-periodic disorder. We prove that, at large distances, the boundary correlations agree with the correlations of a renormalized, translation-invariant, massless relativistic model in $1+1$ dimensions, multiplied by non-universal oscillatory factors, incommensurate with the lattice spacing. Furthermore, we compute the edge conductance and the edge susceptibility, starting from Kubo formula. We obtain explicit expressions for these response functions, completely determined by the renormalized Fermi velocity of the edge modes. In particular, we prove the quantization of the edge conductance, and the non-universality of the susceptibility. The proof relies on multiscale analysis and rigorous renormalization group methods for quasi-periodic systems, and on lattice Ward identities.
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id arxiv_https___arxiv_org_abs_2410_03946
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Edge transport in Haldane-like models with quasi-periodic disorder
Caragiulo, Fabrizio
Mastropietro, Vieri
Porta, Marcello
Mathematical Physics
We consider Haldane-like $2d$ topological insulators on the cylinder, in the presence of weak quasi-periodic disorder. We prove that, at large distances, the boundary correlations agree with the correlations of a renormalized, translation-invariant, massless relativistic model in $1+1$ dimensions, multiplied by non-universal oscillatory factors, incommensurate with the lattice spacing. Furthermore, we compute the edge conductance and the edge susceptibility, starting from Kubo formula. We obtain explicit expressions for these response functions, completely determined by the renormalized Fermi velocity of the edge modes. In particular, we prove the quantization of the edge conductance, and the non-universality of the susceptibility. The proof relies on multiscale analysis and rigorous renormalization group methods for quasi-periodic systems, and on lattice Ward identities.
title Edge transport in Haldane-like models with quasi-periodic disorder
topic Mathematical Physics
url https://arxiv.org/abs/2410.03946