Traveling wave structures of some fourth-order nonlinear partial differential equations

This study presents a large family of the traveling wave solutions to the two fourth-order nonlinear partial differential equations utilizing the Riccati-Bernoulli sub-ODE method.In this method,utilizing a traveling wave transformation with the aid of the Riccati-Bernoulli equation,the fourth-order equation can be transformed into a set of algebraic equations.Solving the set of algebraic equations,we acquire the novel exact solutions of the integrable fourth-order equations presented in this research paper.The physical interpretation of the nonlinear models are also detailed through the exact solutions,which demonstrate the effectiveness of the presented method.The Bäcklund transformation can produce an infinite sequence of solutions of the given two fourth-order nonlinear partial differential equations.Finally,3D graphs of some derived solutions in this paper are depicted through suitable parameter values.