Blow-Up Dynamics for the L2 critical case of the 2D Zakharov-Kuznetsov equation

Abstract

We investigate the blow-up dynamics for the L2 critical two-dimensional Zakharov-Kuznetsov equation equation* cases ∂t u+∂x1 ( u+u3)=0, x=(x1,x2)∈ R2, t ∈ R\\ u(0,x1,x2)=u0(x1,x2)∈ H1(R2), cases equation* with initial data u0 slightly exceeding the mass of the ground state Q. Employing methodologies analogous to the Martel-Merle-Raphael blow-up theory for L2 critical equations, more precisely for the critical NLS equation and the quintic generalized Korteweg-de Vries equation, we categorize the solution behaviors into three outcomes: asymptotic stability, finite-time blow-up, or divergence from the soliton's vicinity. The construction of the blow-up solution involves the bubbling of the solitary wave which ensures the universal behavior and stability of the blow-up.