Lower bound for the rate of blow-up of singular solutions of the Zakharov system in \(\mathbb R^{3}\) (Q2857734)

The authors consider the scalar Zakharov system NEWLINE\[NEWLINE i\partial_t \psi+\Delta \psi=n\psi, \partial_t^2 n-\Delta n=\Delta |\psi |^2 NEWLINE\]NEWLINE in \(\mathbb{R}^3\) for initial conditions \((\psi(0),n(0),n_t(0))\in H^{l+1/2}\times H^l\times H^{l-1}\) (\(l\in [0,1]\)). Assuming that the solution blows up in a finite time, the authors establish a lower bound for the rate of blow-up of the corresponding Sobolev norms in the form NEWLINE\[NEWLINE\|(\psi(t),n(t),n_t(t))\|_{H^{l+1/2}\times H^l\times H^{l-1}}>C (t^*-t)^{-\alpha}NEWLINE\]NEWLINE (\(\alpha=\frac{1}{4}(1+2l)-\)).