Litcius/Paper detail

Enhanced shifted Jacobi operational matrices of integrals: spectral algorithm for solving some types of ordinary and fractional differential equations

H. M. Ahmed

2024Boundary Value Problems20 citationsDOIOpen Access PDF

Abstract

Abstract We provide here a novel approach for solving IVPs in ODEs and MTFDEs numerically by means of a class of MSJPs. Using the SCM, we build OMs for RIs and RLFI for MSJPs as part of our process. These architectures guarantee accurate and efficient numerical computations. We provide theoretical assurances for the efficacy of an algorithm by establishing its convergence and error analysis features. We offer five numerical examples to prove that our method is accurate and applicable. Through these examples, we demonstrate the greater accuracy and efficiency of our approach by comparing our results with previously published findings. Tables and graphs show that the method produces exact and approximate solutions that agree quite well with each other.

Topics & Concepts

Ordinary differential equationMathematicsConvergence (economics)OdePartial differential equationAlgorithmJacobi methodComputationNumerical analysisApplied mathematicsSpectral methodProcess (computing)Differential equationComputer scienceMathematical analysisEconomic growthOperating systemEconomicsFractional Differential Equations SolutionsNumerical methods for differential equationsAdvanced Control Systems Design