Applied Mathematics & Information Sciences
Article Title
New Wave Behaviours of the Generalized Kadomtsev- Petviashvili Modified Equal Width-Burgers Equation
Abstract
In this article, we applied two different methods namely as the (1/G′ )-expansion method and the Bernoulli sub-equation method to investigate the generalized Kadomtsev-Petviashvili modified equal width-Burgers equation, which is designated the propagation of long-wave with dissipation and dispersion in nonlinear media. To transform the given equation into a nonlinear ordinary differential equation, a traveling wave transformation has been carried out. As a result, we constructed distinct exact solutions like complex solutions, singular solutions, and complex singular solutions. Besides, 2D, 3D, and contour surfaces are illustrated to demonstrate the physical properties of the obtained solutions.