Dengjun Guo’s scientific contributions

We consider the two-dimensional incompressible Euler equation $\begin{cases} \partial_t \omega + u\cdot \nabla \omega=0 \\ \omega(0,x)=\omega_0(x). \end{cases}$ We are interested in the cases when the initial vorticity has the form $\omega_0=\omega_{0,\epsilon}+\omega_{0p,\epsilon}$, where $\omega_{0,\epsilon}$ is concentrated near M disjoint points $p_m^0$ and $\omega_{0p,\epsilon}$ is a small perturbation term. First, we prove that for such initial vorticities, the solution $\omega(x,t)$ admits a decomposition $\omega(x,t)=\omega_{\epsilon}(x,t)+\omega_{p,\epsilon}(x,t)$, where $\omega_{\epsilon}(x,t)$ remains concentrated near M points $p_m(t)$ and $\omega_{p,\epsilon}(x,t)$ remains small for $t \in [0,T]$. Second, we give a quantitative description when the initial vorticity has the form $\omega_0(x)=\sum_{m=1}^M \frac{\gamma_m}{\epsilon^2}\eta(\frac{x-p_m^0}{\epsilon})$, where we do not assume $\eta$ to have compact support. Finally, we prove that if $p_m(t)$ remains separated for all $t\in[0,+\infty)$, then $\omega(x,t)$ remains concentrated near M points at least for $t \le c_0 |\log A_{\epsilon}|$, where $A_{\epsilon}$ is small and converges to 0 as $\epsilon \to 0$.