Strong Langmuir turbulence dynamics through the trigonometric quintic and exponential B-spline schemes

In this manuscript, two recent numerical schemes (the trigonometric quintic and exponential cubic B-spline schemes) are employed for evaluating the approximate solutions of the nonlinear Klein-Gordon-Zakharov model. This model describes the interaction between the Langmuir wave and the ion-acoustic wave in a high-frequency plasma. The initial and boundary conditions are constructed via a novel general computational scheme. [1] has used five different numerical schemes, such as the Adomian decomposition method, Elkalla-expansion method, three-member of the well-known cubic B-spline schemes. Consequently, the comparison between our solutions and that have been given in [1], shows the accuracy of seven recent numerical schemes along with the considered model. The obtained numerical solutions are sketched in two dimensional and column distribution to explain the matching between the computational and numerical simulation. The novelty, originality, and accuracy of this research paper are explained by comparing the obtained numerical solutions with the previously obtained solutions.

Automated summary

In this manuscript, two recent numerical schemes were used to evaluate the approximate solutions of the nonlinear Klein-Gordon-Zakharov model, depicting the interaction between Langmuir wave and ion-acoustic wave in high-frequency plasma. Comparison between the solutions obtained in this study and those in previous research showed the accuracy of seven recent numerical schemes and their alignment with the considered model. The novelty, originality, and accuracy of the research paper were demonstrated through comparing the obtained numerical solutions with previously derived solutions.