Long time and Painleve-type asymptotics for the Sasa-Satsuma equation in solitonic space time regions

Abstract

The Sasa-Satsuma equation with 3 × 3 Lax representation is one of the integrable extensions of the nonlinear Schr\"odinger equation. In this paper, we consider the Cauchy problem of the Sasa-Satsuma equation with generic decaying initial data. Based on the Rieamnn-Hilbert problem characterization for the Cauchy problem and the ∂-nonlinear steepest descent method, we find qualitatively different long time asymptotic forms for the Sasa-Satsuma equation in three solitonic space-time regions: (1)\ For the region x<0, |x/t|=O(1), the long time asymptotic is given by q(x,t)=usol(x,t| σd(I)) + t-1/2 h + O (t-3/4). in which the leading term is N(I) solitons, the second term the second t-1/2 order term is soliton-radiation interactions and the third term is a residual error from a ∂ equation. (2)\ For the region x>0, |x/t|=O(1), the long time asymptotic is given by u(x,t)= usol(x,t| σd(I)) + O(t-1). in which the leading term is N(I) solitons, the second term is a residual error from a ∂ equation. (3) \ For the region |x/t1/3|=O(1), the Painleve asymptotic is found by u(x,t)= 1t1/3 uP (xt1/3 ) + O (t2/(3p)-1/2 ), 4<p < ∞. in which the leading term is a solution to a modified Painleve II equation, the second term is a residual error from a ∂ equation.