Search
Now showing items 1-5 of 5
New approximate solutions to electrostatic differential equations obtained by using numerical and analytical methods
(MAR)
In this paper, we implement the optimal homotopy asymptotic method to find the approximate solutions of the Poisson-Boltzmann equation. We also use the results of the conjugate gradient method for comparison with those of ...
NEW APPROXIMATE SOLUTIONS TO THE NONLINEAR KLEIN-GORDON EQUATIONS USING PERTURBATION ITERATION TECHNIQUES
(MAR)
In this study, we present the new approximate solutions of the nonlinear Klein-Gordon equations via perturbation iteration technique and newly developed optimal perturbation iteration method. Some specific examples are ...
New approximate solutions to electrostatic differential equations obtained by using numerical and analytical methods
(MAR)
In this paper, we implement the optimal homotopy asymptotic method to find the approximate solutions of the Poisson-Boltzmann equation. We also use the results of the conjugate gradient method for comparison with those of ...
NEW APPROXIMATE SOLUTIONS TO THE NONLINEAR KLEIN-GORDON EQUATIONS USING PERTURBATION ITERATION TECHNIQUES
(MAR)
In this study, we present the new approximate solutions of the nonlinear Klein-Gordon equations via perturbation iteration technique and newly developed optimal perturbation iteration method. Some specific examples are ...
OPTIMAL ITERATIVE PERTURBATION TECHNIQUE FOR SOLVING JEFFERY-HAMEL FLOW WITH HIGH MAGNETIC FIELD AND NANOPARTICLE
(DEC)
In this research paper, a different semi-analytical analysis of modified magnetohydrodynamic Jeffery-Hamel flow is conducted via the newly developed technique. We use the optimal iterative perturbation method with multiple ...