Saved in:
| Main Authors: | , |
|---|---|
| Format: | Preprint |
| Published: |
2026
|
| Subjects: | |
| Online Access: | https://arxiv.org/abs/2605.16624 |
| Tags: |
Add Tag
No Tags, Be the first to tag this record!
|
| _version_ | 1866910234013859840 |
|---|---|
| author | Cui, Ruijie Zhao, Zhiyan |
| author_facet | Cui, Ruijie Zhao, Zhiyan |
| contents | For the $d-$dimensional nonlinear Maryland model \begin{equation}\label{eq-abs} \ri\partial_t q_n=\tanπ(n\cdot\varpi+x)q_n+ε(Δq)_n+|q_n|^2q_n,\quad n\in{\Z^d}, \end{equation} with $d\in\N^*$, $ε\in \R$ and $\varpi\in\R^d$ satisfying a suitable Diophantine condition, we establish polynomial long-time stability of polynomially weighted $\ell^2$-norm $$\|q(t)\|_s:=\left(\sum_{n\in{\Z^d}}|q_n|^2 (1+|n|^2)^{s}\right)^{\frac{1}{2}},\quad s>0. $$ More precisely, given any $M_*\in\N^*$, for phase parameters $x$ belonging to an almost full-measure subset of $\R/\Z$, if $|ε|$ is sufficiently small, then solutions $q(t)$ of Eq. (\ref{eq-abs}) with high-order weighted $\ell^2$-norm $\|q(0)\|_s$ of sufficiently small size $\varepsilon$ satisfy $$\|q(t)\|_s=\CO(\varepsilon),\quad \forall \ |t|\leq ε^{-1}\varepsilon^{-M_*}. $$ The proof relies on a Birkhoff normal form procedure. |
| format | Preprint |
| id |
arxiv_https___arxiv_org_abs_2605_16624 |
| institution | arXiv |
| publishDate | 2026 |
| record_format | arxiv |
| spellingShingle | Long-time stability for nonlinear Maryland models Cui, Ruijie Zhao, Zhiyan Mathematical Physics Dynamical Systems For the $d-$dimensional nonlinear Maryland model \begin{equation}\label{eq-abs} \ri\partial_t q_n=\tanπ(n\cdot\varpi+x)q_n+ε(Δq)_n+|q_n|^2q_n,\quad n\in{\Z^d}, \end{equation} with $d\in\N^*$, $ε\in \R$ and $\varpi\in\R^d$ satisfying a suitable Diophantine condition, we establish polynomial long-time stability of polynomially weighted $\ell^2$-norm $$\|q(t)\|_s:=\left(\sum_{n\in{\Z^d}}|q_n|^2 (1+|n|^2)^{s}\right)^{\frac{1}{2}},\quad s>0. $$ More precisely, given any $M_*\in\N^*$, for phase parameters $x$ belonging to an almost full-measure subset of $\R/\Z$, if $|ε|$ is sufficiently small, then solutions $q(t)$ of Eq. (\ref{eq-abs}) with high-order weighted $\ell^2$-norm $\|q(0)\|_s$ of sufficiently small size $\varepsilon$ satisfy $$\|q(t)\|_s=\CO(\varepsilon),\quad \forall \ |t|\leq ε^{-1}\varepsilon^{-M_*}. $$ The proof relies on a Birkhoff normal form procedure. |
| title | Long-time stability for nonlinear Maryland models |
| topic | Mathematical Physics Dynamical Systems |
| url | https://arxiv.org/abs/2605.16624 |