Symmetry Methods and Conservation Laws for the Nonlinear Generalized 2D Equal-Width Partial Differential Equation of Engineering

Abstract: In this work, we study the generalized 2D equal-width equation which arises in various fields of science. With the aid of numerous methods which includes Lie symmetry analysis, power series expansion and Weierstrass method, we produce closed-form solutions of this model. The exact solutions obtained are the snoidal wave, cnoidal wave, Weierstrass elliptic function, Jacobi elliptic cosine function, solitary wave and exponential function solutions. Moreover, we give a graphical representation of the obtained sol… Show more

“…Many natural phenomena are determined from NLPDEs of integer order. ese models are used in numerous disciplines of research such as bio-sciences, engineering, and economics [11][12][13]. However, these integer-order models are insufficient without the nonlocal property.…”

Pattern Formation of a Bubbly Fluid Mixture under the Effect of Thermodynamics via Kudryashov‐Sinelshchikov Model

“…Many natural phenomena are determined from NLPDEs of integer order. ese models are used in numerous disciplines of research such as bio-sciences, engineering, and economics [11][12][13]. However, these integer-order models are insufficient without the nonlocal property.…”

Pattern Formation of a Bubbly Fluid Mixture under the Effect of Thermodynamics via Kudryashov‐Sinelshchikov Model

On solutions of one of the second-order nonlinear differential equation: An in-depth look and critical review

Method for finding optical solitons of generalized nonlinear Schrödinger equations