Scattering norm estimate near the threshold for the energy-subcritical NLS

Abstract

We consider the focusing energy-subcritical Schr\"odinger equations. In earlier works by Holmer-Roudenko holmer, Duyckaerts-Holmer-Roudenko duyckaerts2, Akahori-Nawa akahori, Fang-Xie-Cazenave fang, Guevara guevara and later by Dodson-Murphy dodson1,dodson2 and Arora-Dodson-Murphy arora, they proved that scattering is the only dynamical behavior if the H1 initial data satisfies M(u0)(1-sc)/scE(u0)<M(Q)(1-sc)/scE(Q) and \| u\|(1-sc)/scL2\| u\|H1<\| Q\|(1-sc)/scL2\|Q\|H1, where Q is the ground state. In this paper, we establish asymptotic estimates for the upper bound of the scattering norms as M(u0)(1-sc)/scE(u0) approaches the threshold mass-energy threshold M(Q)(1-sc)/scE(Q), which generalizes the work of Duyckaerts-Merle duyckaerts on the energy-critical Schr\"odinger equation(sc=1).