A One-Point Third-Derivative Hybrid Multistep Technique for Solving Second-Order Oscillatory and Periodic Problems

Abstract: This paper describes a third-derivative hybrid multistep technique (TDHMT) for solving second-order initial-value problems (IVPs) with oscillatory and periodic problems in ordinary differential equations (ODEs), the coefficients of which are independent of the frequency omega and step size … Show more

“…The function (17) has coefficients that are the first derivative of ( 10) and (11), which are as follows,…”

“…Partial Differential Equations (PDEs) are a useful tool for the mathematical expression of many natural phenomena and are useful in the solution of physical and other issues requiring functions of several variables. The transmission of heat/sound, fluid movement, turbulent flow, heat transfer analysis, elasticity, electrostatics, and electrodynamics are a few examples of these issues; see Ahsan et al [ 1 ], Wang and Guo [ 2 ], Arif et al [ 3 , 4 ], Adoghe et al [ 5 ], Nawaz et al [ 6 ], Animasaun et al [ 7 ], Devnath et al [ 8 ], Ahsan et al [ 9 ], Wang et al [ 10 ], Rufai et al [ 11 ], Nawaz and Arif [ 12 ], Ramakrishna et al [ 13 ], El Misilmani et al [ 14 ]). According to Quarteroni and Valli [ 15 ], numerical approximation techniques for partial differential equations (PDEs) constitute a cornerstone in diverse scientific and engineering disciplines.…”

Unveiling the Power of Implicit Six-Point Block Scheme: Advancing numerical approximation of two-dimensional PDEs in physical systems

“…The function (17) has coefficients that are the first derivative of ( 10) and (11), which are as follows,…”

“…Partial Differential Equations (PDEs) are a useful tool for the mathematical expression of many natural phenomena and are useful in the solution of physical and other issues requiring functions of several variables. The transmission of heat/sound, fluid movement, turbulent flow, heat transfer analysis, elasticity, electrostatics, and electrodynamics are a few examples of these issues; see Ahsan et al [ 1 ], Wang and Guo [ 2 ], Arif et al [ 3 , 4 ], Adoghe et al [ 5 ], Nawaz et al [ 6 ], Animasaun et al [ 7 ], Devnath et al [ 8 ], Ahsan et al [ 9 ], Wang et al [ 10 ], Rufai et al [ 11 ], Nawaz and Arif [ 12 ], Ramakrishna et al [ 13 ], El Misilmani et al [ 14 ]). According to Quarteroni and Valli [ 15 ], numerical approximation techniques for partial differential equations (PDEs) constitute a cornerstone in diverse scientific and engineering disciplines.…”

Unveiling the Power of Implicit Six-Point Block Scheme: Advancing numerical approximation of two-dimensional PDEs in physical systems

“…In last few years, approximate analytical techniques attract attention of many researchers to fnd the approximate solutions of nonlinear PDE's due to their simplicity and easy approach. Series of methods have been established by mathematicians and researchers such as the homotopy perturbation method (HPM) [18,19], homotopy analysis method (HAM) [20][21][22], variational iteration method (VIM) [23][24][25], Adomian decomposition method (ADM) [26][27][28], diferential transform method (DTM) [29][30][31], tanh method (THM) and extended tanh method [32][33][34], use of trigamma function [35], Catalan-type numbers [36], and polynomials [37][38][39]. Traveling wave solutions are also prominent techniques in fnding the closed form of solutions.…”

Comparison of Approximate Analytical and Numerical Solutions of the Allen Cahn Equation

A survey of (2+1)-dimensional KdV–mKdV equation using nonlocal Caputo fractal–fractional operator