The focusing complex mKdV equation with nonzero background: Large N-order asymptotics of multi-rational solitons and related Painlev\'e-III hierarchy

Abstract

In this paper, we investigate the large-order asymptotics of multi-rational solitons of the focusing complex modified Korteweg-de Vries (c-mKdV) equation with nonzero background via the Riemann-Hilbert problems. First, based on the Lax pair, inverse scattering transform, and a series of deformations, we construct a multi-rational soliton of the c-mKdV equation via a solvable Riemann-Hilbert problem (RHP). Then, through a scale transformation, we construct a RHP corresponding to the limit function which is a new solution of the c-mKdV equation in the rescaled variables X,\,T, and prove the existence and uniqueness of the RHP's solution. Moreover, we also find that the limit function satisfies the ordinary differential equations (ODEs) with respect to space X and time T, respectively. The ODEs with respect to space X are identified with certain members of the Painlev\'e-III hierarchy. We study the large X and transitional asymptotic behaviors of near-field limit solutions, and we provide some part results for the case of large T. These results will be useful to understand and apply the large-order rational solitons in the nonlinear wave equations.

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