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On computational analysis of highly nonlinear model addressing real world applications

S. Ali, Aziz Khan, Kamal Shah, Manar A. Alqudah, Thabet Abdeljawad, Sirajul Islam

2022Results in Physics46 citationsDOIOpen Access PDF

Abstract

This paper presents a numerical strategy for solving boundary value problems (BVPs) that is based on the Haar wavelets method (HWM). BVPs having high Prandtl numbers are discussed, Because they are very important in many practical problems of science and engineering. By using group-theoretic method, the considered model of partial differential equations (PDEs) are converted to system of nonlinear ordinary differential equations. By using HWM, the numerical results are established. Further, solutions obtained on a coarse resolution with low accuracy is refined towards higher accuracy by increasing the level of resolution. Superiority of the HWM has been established over the commercial software NDSolve and available numerical and approximated methods.

Topics & Concepts

Partial differential equationNonlinear systemBoundary value problemApplied mathematicsNumerical analysisComputer scienceOrdinary differential equationPrandtl numberResolution (logic)Haar waveletMathematicsDifferential equationWaveletMathematical optimizationMathematical analysisHeat transferWavelet transformPhysicsMechanicsDiscrete wavelet transformQuantum mechanicsArtificial intelligenceFractional Differential Equations SolutionsIterative Methods for Nonlinear EquationsDifferential Equations and Numerical Methods
On computational analysis of highly nonlinear model addressing real world applications | Litcius