On continuation properties after blow-up time for L2-critical gKdV equations

Abstract

In this paper, we consider a blow-up solution u(t) to the L2-critical gKdV equation ∂tu+(uxx+u5)x=0, with finite blow-up time T<+∞. We expect to construct a natural extension of u(t) after the blow-up time. To do this, we consider the solution uγ(t) to the saturated L2-critical gKdV equation ∂tu+(uxx+u5-γ u|u|q-1)x=0 with the same initial data, where γ>0 and q>5. A standard argument shows that uγ(t) is always global in time and for all t<T, uγ(t) converges to u(t) in H1 as γ→0. We prove in this paper that for all t≥ T, uγ(t) converges to some v(t) as γ→0, in a certain sense. This limiting function v(t) is a weak solution to the unperturbed L2-critical gKdV, hence can be viewed as a natural extension of u(t) after the blow-up time.