The Cauchy problem for the L2-critical generalized Zakharov-Kuznetsov equation in dimension 3

Abstract

We prove local well-posedness for the L2 critical generalized Zakharov-Kuznetsov equation in Hs, \, s ∈ (3/4,1). We also prove that the equation is "almost well-posedness" for initial data u0 ∈ Hs, \, s ∈ [1,2), in the sense that the solution belongs to a certain intersection C([0,T] : Hs(R3)) XsT and is unique within that class, where we can ensure continuity of the data-to-solution map in an only slightly larger space. We also prove that solutions satisfy the expected conservation of L2-mass for the whole s ∈ (3/4,2) range, and energy for s ∈ (1,2). By a limiting argument, this implies, in particular, global existence for small initial data in H1. Finally, we study the question of almost everywhere (a.e.) convergence of solutions of the initial value problem to initial data.