On the N∞-soliton asymptotics for the modified Camassa-Holm equation with linear dispersion and vanishing boundaries

Abstract

We explore the N∞-soliton asymptotics for the modified Camassa-Holm (mCH) equation with linear dispersion and boundaries vanishing at infinity: mt+(m(u2-ux2)2)x+ ux=0, m=u-uxx with x→ ∞ u(x,t)=0. We mainly analyze the aggregation state of N-soliton solutions of the mCH equation expressed by the solution of the modified Riemann-Hilbert problem in the new (y,t)-space when the discrete spectra are located in different regions. Starting from the modified RH problem, we find that i) when the region is a quadrature domain with =n=1, the corresponding N∞-soliton is the one-soliton solution which the discrete spectral point is the center of the region; ii) when the region is a quadrature domain with =n, the corresponding N∞-soliton is an n-soliton solution; iii) when the discrete spectra lie in the line region, we provide its corresponding Riemann-Hilbert problem,; and iv) when the discrete spectra lie in an elliptic region, it is equivalent to the case of the line region.