Dynamical behavior of analytical soliton solutions, bifurcation analysis, and quasi-periodic solution to the (2+1)-dimensional Konopelchenko-Dubrovsky (KD) system

Abstract: Nonlinear evolution equations (NLEEs) are extensively used to establish the elementary propositions of natural circumstances. In this work, we study the Konopelchenko-Dubrovsky (KD) equation which depicts non-linear waves in mathematical physics with weak dispersion. The considered model is investigated using the combination of generalized exponential rational function (GERF) method and dynamical system method. The GERF method is utilized to generate closed-form invariant solutions to the (2+1)-dimensional KD … Show more

“…Consequently, in nonlinear sciences, the search for mathematical approaches for creating the analytical solutions to NEEs is currently a crucial and vital task. In recent years, numerous techniques for addressing NEEs have been developed, including F-expansion technique [1], spectral methods [2], exp −ϕ ς -expansion [3], tanh-sech method [4], Hirota's method [5], extended trial equation [6], extended tanh-coth method [7,8], Lie's symmetry analysis [9][10][11], He's semi-inverse method [12], generalized exponential rational function [13], generalized Riccati simplest equation [14,15], new auxiliary equation approach [16], perturbation method [17], G ′ /G -expansion [18,19], improved Sardar subequation [20], Jacobi elliptic function [21,22], modified simple equation method [23], and more recent techniques.…”

Optical Solitons for the Fokas-Lenells Equation with Beta and M-Truncated Derivatives

“…Consequently, in nonlinear sciences, the search for mathematical approaches for creating the analytical solutions to NEEs is currently a crucial and vital task. In recent years, numerous techniques for addressing NEEs have been developed, including F-expansion technique [1], spectral methods [2], exp −ϕ ς -expansion [3], tanh-sech method [4], Hirota's method [5], extended trial equation [6], extended tanh-coth method [7,8], Lie's symmetry analysis [9][10][11], He's semi-inverse method [12], generalized exponential rational function [13], generalized Riccati simplest equation [14,15], new auxiliary equation approach [16], perturbation method [17], G ′ /G -expansion [18,19], improved Sardar subequation [20], Jacobi elliptic function [21,22], modified simple equation method [23], and more recent techniques.…”

Optical Solitons for the Fokas-Lenells Equation with Beta and M-Truncated Derivatives