Higher order Airy and Painlevé asymptotics for the mKdV hierarchy

Abstract: In this paper, we consider Cauchy problem for the modified Korteweg-de Vries hierarchy on the real line with decaying initial data. Using the Riemann-Hilbert formulation and nonlinear steepest descent method, we derive a uniform asymptotic expansion to all orders in powers of t −1/(2n+1) with smooth coefficients of the variable (−1) n+1 x((2n + 1)t) −1/(2n+1) in the self-similarity region for the solution of n-th member of the hierarchy. It turns out that the leading asymptotics is described by a family of spe… Show more

“…Charlier and Lenells have carefully considered the Airy and higher order Painlevé asymptotics for the mKdV equation in [28]. Recently, Huang and Zhang further obtained Painlevé asymptotics for the whole mKdV hierarchy [29].…”

Defocusing NLS equation with nonzero background: Large-time asymptotics in a solitonless region

“…Charlier and Lenells have carefully considered the Airy and higher order Painlevé asymptotics for the mKdV equation in [28]. Recently, Huang and Zhang further obtained Painlevé asymptotics for the whole mKdV hierarchy [29].…”

Defocusing NLS equation with nonzero background: Large-time asymptotics in a solitonless region

“…Recently, Huang and Zhang complete the extension from the Painlevé asymptotics analysis for the mKdV equation to that of the mKdV hierarchy [22].…”

Painleve-type asymptotics for the defocusing Hirota equation in transition region