Soliton solutions of some nonlinear evolution equations in shallow water theory

“…Obtaining new analytical solutions for various models formed by NLPDE has wide application in nonlinear physics fields including fluid dynamics, fiber optics, plasma physics, and optics. Considering the rapid growth of symbolic computation systems, soliton solutions make it possible to analyze nonlinear physical phenomena; thus, examination of the soliton solutions for NLPDE has recently attracted the attention of researchers [1,2]. In the literature, there are diverse approaches applied by researchers to produce analytical solutions of NLPDE such as the first integral method [3,4], the extended Kudryashov technique [5], the Riccati Bernoulli sub-ODE scheme [6,7], the modified simple equation scheme [8], the extended rational sine-cosine and sinh-cosh method [9], the extended Poincare-Lighthill-Kuo method [10], the extended simplest equation method [11], traveling wave solution [12], the auxiliary ordinary differential equation method and the generalized Riccati method [13], the solitary wave solution technique with the…”

Nonlinear complex generalized zakharov dynamical system inconformal sense utilizing new kudryashov method

“…Obtaining new analytical solutions for various models formed by NLPDE has wide application in nonlinear physics fields including fluid dynamics, fiber optics, plasma physics, and optics. Considering the rapid growth of symbolic computation systems, soliton solutions make it possible to analyze nonlinear physical phenomena; thus, examination of the soliton solutions for NLPDE has recently attracted the attention of researchers [1,2]. In the literature, there are diverse approaches applied by researchers to produce analytical solutions of NLPDE such as the first integral method [3,4], the extended Kudryashov technique [5], the Riccati Bernoulli sub-ODE scheme [6,7], the modified simple equation scheme [8], the extended rational sine-cosine and sinh-cosh method [9], the extended Poincare-Lighthill-Kuo method [10], the extended simplest equation method [11], traveling wave solution [12], the auxiliary ordinary differential equation method and the generalized Riccati method [13], the solitary wave solution technique with the…”

Nonlinear complex generalized zakharov dynamical system inconformal sense utilizing new kudryashov method

Exact solutions to the $$(3 + 1)$$-dimensional time-fractional KdV–Zakharov–Kuznetsov equation and modified KdV equation with variable coefficients

Dynamics characteristics of soliton structures of the new (3 + 1) dimensional integrable wave equations with stability analysis