The purpose of this paper is concerned with developing two-mode higher-order modified Korteweg-de Vries (KdV) equations. The study shows that multiple soliton solutions exist for essential conditions related to the nonlinearity and dispersion parameters.
The proposed technique for constructing a two-wave model, as presented in this work, has been shown to be very efficient. The employed approach formally derives the essential conditions for soliton solutions to exist.
The examined two-wave model features interesting results in propagation of waves and fluid flow.
The paper presents a new and efficient algorithm for constructing and studying two-wave-mode higher-order modified KdV equations.
A two-wave model was constructed for higher-order modified KdV equations. The essential conditions for multiple soliton solutions to exist were derived.
The work shows the distinct features of the standard equation and the newly developed equation.
The work is original and this is the first time for two-wave-mode higher-order modified KdV equations to be constructed and studied.
