Sharp Lower Bound for the Blow-up Rate of Solutions to the Magnetic Zakharov System without the Skin Effect

Abstract: In this paper, we consider the Cauchy problem of the magnetic Zakharov system in two-dimensional space: [ \begin{cases} & i E_{1t}+\Delta E_1-n E_1+\eta E_2 (E_1\overline{E_2}-\overline{E_1} E_2)=0, \ & i E_{2t}+\Delta E_2-n E_2+\eta E_1(\overline{E_1} E_2-E_1\overline{E_2})=0, \ & n_t+\nabla \cdot \textbf{v}=0, \ & \textbf{v}t+\nabla n+\nabla (|E_1|^2+|E_2|^2)=0, \ \end{cases} \tag{G-Z} ] with initial data $\left(E{10}(x),E_{20}(x),n_{0}(x),\mathbf{v}{0}(x)\right)$, which describes the spontaneous generation of a magnetic field without the skin effect in a cold plasma, where $\eta>0$ is a physical constant coefficient. The two nonlinear terms generated by the cold magnetic field bring in a different difficulty from that for the classical Zakharov system. Assuming the initial mass satisfies the following estimates: \begin{gather*} \frac{||Q||{L^2(\mathbb{R}^2)}^2}{1+\eta} <||E_{10}||{L^2(\mathbb{R}^2)}^2+||E{20}||{L^2(\mathbb{R}^2)}^2 <\frac{||Q||{L^2(\mathbb{R}^2)}^2}{\eta}, \end{gather*} where $Q$ is the unique radially positive solution of the equation $-\Delta V+V=V^3 $, we prove that there is a constant $c>0$ depending only on the initial data such that for $t$ near $T$ (the blow-up time), \begin{gather*} \left|\left(E_1,E_2,n,\textbf{v}\right)\right|_{H^1(\mathbb{R}^2)\times H^1(\mathbb{R}^2)\times L^2(\mathbb{R}^2)\times L^2(\mathbb{R}^2)}\geqslant \frac{c}{ T-t }. \end{gather*} As the magnetic coefficient $\eta$ tends to $0$, the blow-up rate recovers the result for the classical 2-D Zakharov system due to Merle \cite{25Frank}. For any size positive $\eta$, under the current assumption on the initial mass, we give a mathematically rigorous justification for the fact that the presence of magnetic effects without the skin effect in the cold plasma does not change the optimal lower bound for the blow-up rates.