Soliton resolution for the complex short pulse equation with weighted Sobolev initial data

Abstract

We employ the ∂-steepest descent method in order to investigate the Cauchy problem of the complex short pulse (CSP) equation with initial conditions in weighted Sobolev space H1,1(R)=\f∈ L2(R): f',xf∈ L2(R)\. The long time asymptotic behavior of the solution u(x,t) is derived in a fixed space-time cone S(x1,x2,v1,v2)=\(x,t)∈R2: y=y0+vt, ~y0∈[y1,y2], ~v∈[v1,v2]\. Based on the resulting asymptotic behavior, we prove the solution resolution conjecture of the CSP equation which includes the soliton term confirmed by N(I)-soliton on discrete spectrum and the t-12 order term on continuous spectrum with residual error up to O(t-1).

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