The Cauchy problem for the Degasperis-Procesi Equation: Painlev\'e Asymptotics in Transition Zones

Abstract

The Degasperis-Procesi (DP) equation align &ut-utxx+3 ux+4uux=3ux uxx+uuxxx, align serving as an asymptotic approximation for the unidirectional propagation of shallow water waves, is an integrable model of the Camassa-Holm type and admits a 3×3 matrix Lax pair. In our previous work, we obtained the long-time asymptotics of the solution u(x,t) to the Cauchy problem for the DP equation in the solitonic region \(x,t): >3 \ \(x,t): <-38 \ and the solitonless region \(x,t): -38<< 0 \ \(x,t): 0≤ <3 \ where :=xt. In this paper, we derive the leading order approximation to the solution u(x,t) in terms of the solution for the Painlev\'e 2 equation in two transition zones |+38|t2/3<C and | -3|t2/3<C with C>0 lying between the solitonic region and solitonless region. Our results are established by performing the ∂-generalization of the Deift-Zhou nonlinear steepest descent method and applying a double scaling limit technique to an associated vector Riemann-Hilbert problem.