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Application of an Extended Cubic B-Spline to Find the Numerical Solution of the Generalized Nonlinear Time-Fractional Klein–Gordon Equation in Mathematical Physics

Miguel José Vivas Cortez, M.J. Huntul, Maria Khalid, Madiha Shafiq, Muhammad Abbas, Muhammad Kashif Iqbal

2024Computation12 citationsDOIOpen Access PDF

Abstract

A B-spline function is a series of flexible elements that are managed by a set of control points to produce smooth curves. By using a variety of points, these functions make it possible to build and maintain complicated shapes. Any spline function of a certain degree can be expressed as a linear combination of the B-spline basis of that degree. The flexibility, symmetry and high-order accuracy of the B-spline functions make it possible to tackle the best solutions. In this study, extended cubic B-spline (ECBS) functions are utilized for the numerical solutions of the generalized nonlinear time-fractional Klein–Gordon Equation (TFKGE). Initially, the Caputo time-fractional derivative (CTFD) is approximated using standard finite difference techniques, and the space derivatives are discretized by utilizing ECBS functions. The stability and convergence analysis are discussed for the given numerical scheme. The presented technique is tested on a variety of problems, and the approximate results are compared with the existing computational schemes.

Topics & Concepts

Nonlinear systemKlein–Gordon equationMathematical analysisPhysicsSpline (mechanical)Mathematical physicsMonotone cubic interpolationMathematicsQuantum mechanicsThermodynamicsTrilinear interpolationPolynomialLinear interpolationFractional Differential Equations SolutionsNonlinear Waves and SolitonsNumerical methods in engineering
Application of an Extended Cubic B-Spline to Find the Numerical Solution of the Generalized Nonlinear Time-Fractional Klein–Gordon Equation in Mathematical Physics | Litcius