Stationary wave solutions for new developed two-waves’ fifth-order Korteweg–de Vries equation

Abstract: In this work, we present a new two-waves' version of the fifth-order Korteweg-de Vries model. This model describes the propagation of moving two-waves under the influence of dispersion, nonlinearity, and phase velocity factors. We seek possible stationary wave solutions to this new model by means of Kudryashov-expansion method and sine-cosine function method. Also, we provide a graphical analysis to show the effect of phase velocity on the motion of the obtained solutions. MSC: 35C08; 74J35

“…Now summing identities (6) and (10) over all elements of the partition, use formulas (11), and the definition of the numerical fluxes, we get…”

“…Numerical and analytical methods play an important role for solving many mathematical models arising in physics and applied sciences. Indeed, several researchers use numerical and analytical methods for solving some scientific problems (see, e.g., [1][2][3][4][5][6][7][8][9][10][11][12][13]). As in [1], the authors have generalized F ξ -calculus for fractals embedding in R 3 , and in [12] an efficient computational technique for fractal vehicular traffic flow is presented.…”

“…A new analysis of the Fornberg-Whitham equation pertaining to a fractional derivative with Mittag-Leffler-type kernel is studied by Kumar, Singh, and Baleanu [11]. Recently, Ali et al [6] presented a new interesting two-wave version of the fifth-order Korteweg-de Vries model. Baleanu et al [7] investigated the existence of solutions for a three-step crisis fractional integro-differential equation under some boundary conditions, and Veeresha et al [8] presented an efficient numerical technique for the nonlinear fractional Kolmogorov-Petrovskii-Piskunov equation.…”

A new mixed discontinuous Galerkin method for the electrostatic field

“…Now summing identities (6) and (10) over all elements of the partition, use formulas (11), and the definition of the numerical fluxes, we get…”

“…Numerical and analytical methods play an important role for solving many mathematical models arising in physics and applied sciences. Indeed, several researchers use numerical and analytical methods for solving some scientific problems (see, e.g., [1][2][3][4][5][6][7][8][9][10][11][12][13]). As in [1], the authors have generalized F ξ -calculus for fractals embedding in R 3 , and in [12] an efficient computational technique for fractal vehicular traffic flow is presented.…”

“…A new analysis of the Fornberg-Whitham equation pertaining to a fractional derivative with Mittag-Leffler-type kernel is studied by Kumar, Singh, and Baleanu [11]. Recently, Ali et al [6] presented a new interesting two-wave version of the fifth-order Korteweg-de Vries model. Baleanu et al [7] investigated the existence of solutions for a three-step crisis fractional integro-differential equation under some boundary conditions, and Veeresha et al [8] presented an efficient numerical technique for the nonlinear fractional Kolmogorov-Petrovskii-Piskunov equation.…”

A new mixed discontinuous Galerkin method for the electrostatic field

“…The reason behind this intensive interest is that FDEs provide practical tools for the depictions of memory and inherited properties of many materials and processes. As a result, FDEs have experienced significant developments in recent years; see [5,6,13,28,30,32,34,35,41,45] for further details.…”

Stability analysis of a nonlinear coupled implicit switched singular fractional differential system with p-Laplacian

“…Investigation of analytical solutions of nonlinear FDEs is very important in the analysis of some physical phenomena, such as plasma physics, solid-state physics, nonlinear optics, and so on [6][7][8][9]. In order to understand the mechanisms of these cases, it is necessary to obtain their exact solutions [10,11]. Thus, many researchers have tried to obtain analytical solutions of these equations.…”

An analytical approach to obtain exact solutions of some space-time conformable fractional differential equations