Fractal Fract, Vol. 8, Pages 593: The Extended Weierstrass Transformation Method for the Biswas–Arshed Equation with Beta Time Derivative

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Fractal Fract, Vol. 8, Pages 593: The Extended Weierstrass Transformation Method for the Biswas–Arshed Equation with Beta Time Derivative

Fractal and Fractional doi: 10.3390/fractalfract8100593

Authors: Sertac Goktas Aslı Öner Yusuf Gurefe

In this article, exact solutions of the Biswas–Arshed equation are obtained using the extended Weierstrass transformation method (EWTM). This method is widely used in solid-state physics, electrodynamics, and mathematical physics, and it yields exact solution functions involving trigonometric, rational trigonometric, Weierstrass elliptic, wave, and rational functions. The process involves expanding the solution functions of an elliptic differential equation into finite series by transforming them into Weierstrass functions. Furthermore, it generates parametric solutions for nonlinear algebraic equation systems, which are particularly useful in mathematical physics. These solutions are derived using the Mathematica package program. To analyze the behavior of these determined solution functions, the article employs separate two- and three-dimensional graphs showing the real and imaginary components, along with contour and density graphs. These visuals aid in comprehending the physical characteristics exhibited by these solution functions.

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