Some Results on the Scattering Theory for a Schr\"odinger Equation with Combined Power-Type Nonlinearities

Abstract

In this paper, we consider the Cauchy problem align* \arrayll&i ut+ u=λ1|u|p1u+λ2|u|p2u, t∈R, x∈RN &u(0,x)=φ(x)∈ , x∈RN, array. align* where N≥ 3, 0<p1<p2≤4N-2, λ1∈R\0\ and λ2∈R are constants, =\f∈ H1(RN); |x|f∈ L2(RN)\. Using the strategy in Cazenave2, Cazenave3 and taking some elementary techniques which differ from the pseudoconformal conservation law, we obtain some scattering properties, which partly solve the open problems of Terence Tao, Monica Visan and Xiaoyi Zhang[The nonlinear Schr\"odinger equation with combined power-type nonlinearities, Communications in Partial Differential Equations, 32(2007), 1281--1343]. As a byproduct, we establish the scattering theory in for align* \arrayll&i ut+ u=λ|u|pu, t∈R, x∈RN &u(0,x)=φ(x), x∈RN array. \=align* with λ>0 and 2N<p<α0 with α0=2-N+N2+12N+42N, which is also an open problem in this direction.