The Impact of the Wiener Process on the Analytical Solutions of the Stochastic (2+1)-Dimensional Breaking Soliton Equation by Using Tanh–Coth Method

Abstract: The stochastic (2+1)-dimensional breaking soliton equation (SBSE) is considered in this article, which is forced by the Wiener process. To attain the analytical stochastic solutions such as the polynomials, hyperbolic and trigonometric functions of the SBSE, we use the tanh–coth method. The results provided here extended earlier results. In addition, we utilize Matlab tools to plot 2D and 3D graphs of analytical stochastic solutions derived here to show the effect of the Wiener process on the solutions of the … Show more

“…As a result, solving nonlinear problems is crucial in nonlinear sciences. Some of these methods, such as Darboux transformation [1], sine-cosine [2,3], exp ð−ϕðς ÞÞ-expansion [4], ðG′/GÞ-expansion [5,6], Hirota's function [7], perturbation [8,9], Jacobi elliptic function [10,11], trial function [12], tanh-sech [13], fractal semi-inverse method [14,15], F-expansion method [16], and homotopy perturbation method [17], have been recently developed. However, it is completely obvious that the phenomena that happen in the environment are not always deterministic.…”

The Analytical Solutions of the Stochastic Fractional RKL Equation via Jacobi Elliptic Function Method

“…As a result, solving nonlinear problems is crucial in nonlinear sciences. Some of these methods, such as Darboux transformation [1], sine-cosine [2,3], exp ð−ϕðς ÞÞ-expansion [4], ðG′/GÞ-expansion [5,6], Hirota's function [7], perturbation [8,9], Jacobi elliptic function [10,11], trial function [12], tanh-sech [13], fractal semi-inverse method [14,15], F-expansion method [16], and homotopy perturbation method [17], have been recently developed. However, it is completely obvious that the phenomena that happen in the environment are not always deterministic.…”

The Analytical Solutions of the Stochastic Fractional RKL Equation via Jacobi Elliptic Function Method

“…The tanh-coth method for some nonlinear pseudo-parabolic equations, including the Benjamin-Bona-Mahony-Peregrine-Burgers equation, the Oskolkov-Benjamin-Bona-Mahony-Burgers equation, the Oskolkov equation and the generalized hyperelastic-rod wave equation, were discussed in [11]. Recently, the method has also been successfully applied to stochastic differential equations [12,13] and fractional differential equations [14,15]. Some extended methods including the extended tanh method [16,17] and the modified tanh-coth method [18], were developed for the Zakharov-like equation, fourth-order Boussinesq equation, the Klein-Gordon equations, the Khokhlov-Zabolotskaya-Kuznetsov, the Newell-Whitehead-Segel and the Rabinovich wave equations.…”

New Traveling Wave Solutions for the Sixth-order Boussinesq Equation

“…It seems that studying FPDE models with stochastic influences is more important. To the best of knowledge, little research has been conducted in order to obtain exact solutions to fractional SPDEs, for instance [28][29][30][31]. As a result, the purpose of this paper is to find the exact solution to the following space-fractional stochastic Bogoyavlenskii equation (SFSBE) [32] in the Stratonovich sense:…”

The Influence of Noise on the Solutions of Fractional Stochastic Bogoyavlenskii Equation