Long-time asymptotics for the reverse space-time nonlocal Hirota equation with decaying initial value problem: Without solitons
Abstract
In this work, we mainly consider the Cauchy problem for the reverse space-time nonlocal Hirota equation with the initial data rapidly decaying in the solitonless sector. Start from the Lax pair, we first construct the basis Riemann-Hilbert problem for the reverse space-time nonlocal Hirota equation. Furthermore, using the approach of Deift-Zhou nonlinear steepest descent, the explicit long-time asymptotics for the reverse space-time nonlocal Hirota is derived. For the reverse space-time nonlocal Hirota equation, since the symmetries of its scattering matrix are different with the local Hirota equation, the (λi)(i=0, 1) would like to be imaginary, which results in the δλi0 contains an increasing t Im(λi)2, and then the asymptotic behavior for nonlocal Hirota equation becomes differently.
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