English

Global in-time rough large data solution to complex-valued semilinear damped evolution equations

Analysis of PDEs 2025-07-14 v1

Abstract

We study the semilinear Cauchy problem for complex-valued damped evolution equations \begin{align*} \partial_t^2u+(-\Delta)^{\sigma}u+(-\Delta)^{\delta}\partial_tu=u^p,\ \ u(0,x)=u_0(x),\ \partial_tu(0,x)=u_1(x), \end{align*} with δ[0,σ]\delta\in[0,\sigma], σR+\sigma\in\mathbb{R}_+ and pN+\{1}p\in\mathbb{N}_+\backslash\{1\}, where the initial data belong to the rough space EsαE^{\alpha}_s endowed with the norm \begin{align*} \|f\|_{E^{\alpha}_s}=\big\|\langle\xi\rangle^s\,2^{\alpha|\xi|}\widehat{f}(\xi)\big\|_{L^2}\ \ \mbox{with}\ \ \alpha<0, \ s\in\mathbb{R}. \end{align*} Concerning (u0,u1)Es+κˉα×Esα(u_0,u_1)\in E^{\alpha}_{s+\bar{\kappa}}\times E^{\alpha}_s when sn22κ+κˉ2δp1κˉs\geqslant\frac{n}{2}-\frac{2\kappa+\bar{\kappa}-2\delta}{p-1}-\bar{\kappa} with κ=min{2δ,σ}\kappa=\min\{2\delta,\sigma\} and κˉ=max{2δ,σ}\bar{\kappa}=\max\{2\delta,\sigma\} whose Fourier transforms are supported in a suitable subset of first octant, we prove a global in-time existence result without requiring the smallness of rough initial data.

Keywords

Cite

@article{arxiv.2507.08272,
  title  = {Global in-time rough large data solution to complex-valued semilinear damped evolution equations},
  author = {Wenhui Chen and Michael Reissig},
  journal= {arXiv preprint arXiv:2507.08272},
  year   = {2025}
}
R2 v1 2026-07-01T03:55:56.638Z