On asymptotic dynamics for L2 critical generalized KdV equations with a saturated perturbation

Abstract

In this paper, we consider the L2 critical gKdV equation with a saturated perturbation: ∂t u+(uxx+u5-γ u|u|q-1)x=0, where q>5 and 0<γ1. For any initial data u0∈ H1, the corresponding solution is always global and bounded in H1. This equation has a family of solitons, and our goal is to classify the dynamics near soliton. Together with a suitable decay assumption, there are only three possibilities: (i) the solution converges asymptotically to a solitary wave, whose H1 norm is of size γ-2/(q-1), as γ→0; (ii) the solution is always in a small neighborhood of the modulated family of solitary waves, but blows down at +∞; (iii) the solution leaves any small neighborhood of the modulated family of the solitary waves. This extends the classification of the rigidity dynamics near the ground state for the unperturbed L2 critical gKdV (corresponding to γ=0) by Martel, Merle and Rapha\"el. However, the blow-down behavior (ii) is completely new, and the dynamics of the saturated equation cannot be viewed as a perturbation of the L2 critical dynamics of the unperturbed equation. This is the first example of classification of the dynamics near ground state for a saturated equation in this context. The cases of L2 critical NLS and L2 supercritical gKdV, where similar classification results are expected, are completely open.