The Painlev\'{e}-type asymptotics of defocusing complex mKdV equation with finite density initial data

We consider the Cauchy problem for the defocusing complex mKdV equation with a finite density initial data \begin{align*} &q_t+\frac{1}{2}q_{xxx}-\left(|q|^2q\right)_{x}=0,\\ &q(x,0)=q_{0}(x) \sim \pm 1, \ x\to \pm\infty, \end{align*} which can be formulated into a Riemann-Hilbert(RH) problem. With a $\bar\partial$-generation of the nonlinear steepest descent approach and a double scaling limit technique, in the transition region $$\mathcal{D}:=\left\{(x,t)\in\mathbb{R}\times\mathbb{R}^+\big|-C< \left(\frac{x}{2t}+\frac{3}{2}\right) t^{2/3}<0, C\in\mathbb{R}^+\right\},$$ we find that the long-time asymptotics of the solution $q(x,t)$ to the Cauchy problem is associated with the Painlev\'{e}-II transcendents.