On the Global Existence and Blowup Phenomena of Schr\"odinger Equations with Multiple Nonlinearities

Abstract

In this paper, we consider the global existence and blowup phenomena of the following Cauchy problem align* \arrayll&-i ut= u-V(x)u+f(x,|u|2)u+(W|u|2)u, x∈RN, t>0, &u(x,0)=u0(x), x∈RN, array . align* where V(x) and W(x) are real-valued potentials with V(x)≥ 0 and W is even, f(x,|u|2) is measurable in x and continuous in |u|2, and u0(x) is a complex-valued function of x. We obtain some sufficient conditions and establish two sharp thresholds for the blowup and global existence of the solution to the problem. These results can be looked as the supplement to Chapter 6 of Cazenave2. In addition, our results extend those of Zhang and improve some of Tao2.