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| Natura: | Preprint |
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2026
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| Accesso online: | https://arxiv.org/abs/2604.12248 |
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| _version_ | 1866914470934085632 |
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| author | Fan, Jiaqi Yang, Fan Yin, Jun |
| author_facet | Fan, Jiaqi Yang, Fan Yin, Jun |
| contents | We study large $N\times N$ power-law random band matrices $H=(H_{ij})$ with centered complex Gaussian entries, where the variances satisfy a power-law decay $\mathbb{E}|H_{ij}|^2\propto (|i-j|/W+1)^{-1-α}$, for some exponent $α>-1$ and bandwidth $W\gg 1$. We establish the following lower bounds, with high probability, on the localization length $\ell$ of bulk eigenvectors in the different regimes of $α$: (1) $\ell=N$ if $-1<α<0$; (2) $\ell \ge W^{C}$ for any large constant $C>0$ if $0 < α<1$; (3) $\ell \ge W^{α/(α-1)}$ if $1 < α<2$; (4) $\ell \ge W^{2}$ if $ α> 2$. These results verify the physical conjecture of arXiv:cond-mat/9604163 on the delocalized side. The main difficulty in the proof lies in handling the interplay between the non-mean-field nature of the model and the slow decay of the variance profile. To address this issue, a key technical ingredient is a new dynamical analysis of $T$-variables formed from pairs of resolvent entries of $H$. In contrast to the fundamental works on regular random band matrices with fast-decaying variances in arXiv:2501.01718 and arXiv:2506.06441, this approach does not rely on higher-order resolvent loops. |
| format | Preprint |
| id |
arxiv_https___arxiv_org_abs_2604_12248 |
| institution | arXiv |
| publishDate | 2026 |
| record_format | arxiv |
| spellingShingle | Localization Lengths of Power-Law Random Band Matrices Fan, Jiaqi Yang, Fan Yin, Jun Probability Mathematical Physics We study large $N\times N$ power-law random band matrices $H=(H_{ij})$ with centered complex Gaussian entries, where the variances satisfy a power-law decay $\mathbb{E}|H_{ij}|^2\propto (|i-j|/W+1)^{-1-α}$, for some exponent $α>-1$ and bandwidth $W\gg 1$. We establish the following lower bounds, with high probability, on the localization length $\ell$ of bulk eigenvectors in the different regimes of $α$: (1) $\ell=N$ if $-1<α<0$; (2) $\ell \ge W^{C}$ for any large constant $C>0$ if $0 < α<1$; (3) $\ell \ge W^{α/(α-1)}$ if $1 < α<2$; (4) $\ell \ge W^{2}$ if $ α> 2$. These results verify the physical conjecture of arXiv:cond-mat/9604163 on the delocalized side. The main difficulty in the proof lies in handling the interplay between the non-mean-field nature of the model and the slow decay of the variance profile. To address this issue, a key technical ingredient is a new dynamical analysis of $T$-variables formed from pairs of resolvent entries of $H$. In contrast to the fundamental works on regular random band matrices with fast-decaying variances in arXiv:2501.01718 and arXiv:2506.06441, this approach does not rely on higher-order resolvent loops. |
| title | Localization Lengths of Power-Law Random Band Matrices |
| topic | Probability Mathematical Physics |
| url | https://arxiv.org/abs/2604.12248 |