Novel Soliton Solutions of the Fractional Riemann Wave Equation via a Mathematical Method

The Riemann wave equation is an intriguing nonlinear in the areas of tsunamis and tidal waves oceans, electromagnetic transmission lines, magnetic ionic sound radiations plasmas, static uniform media, etc. In this innovative research, analytical solutions fractional with a conformable derivative were retrieved as special case, broad-spectrum unknown parameters established improved (G’/G)-expansion method. For various values these parameters, renowned periodic, singular, anti-singular kink-shaped solitons retrieved. Using Maple software, we investigated by drawing 3D, 2D, contour plots created to analyze dynamic behavior waves. discovered might be crucial disciplines science ocean engineering.