Long-time asymptotic behavior of a mixed schr\"odinger equation with weighted Sobolev initial data

Abstract

We apply ∂ steepest descent method to obtain sharp asymptotics for a mixed schr\"odinger equation qt+iqxx-ia ( q 2q)x -2b2 q 2q=0, q(x,t=0)=q0(x), under essentially minimal regularity assumptions on initial data in a weighted Sobolev space q0(x) ∈ H2,2(R). In the asymptotic expression, the leading order term O(t-1/2) comes from dispersive part qt+iqxx and the error order O(t-3/4) from a ∂ equation