Litcius/Paper detail

An approach based on Haar wavelet for the approximation of fractional calculus with application to initial and boundary value problems

Vaibhav Mehandiratta, Mani Mehra, Günter Leugering

2020Mathematical Methods in the Applied Sciences39 citationsDOI

Abstract

In this paper, we propose the numerical approximation of fractional initial and boundary value problems using Haar wavelets. In contrast to the Haar wavelet methods available in literature, where the fractional derivative of the function is approximated using the Haar basis, we approximate the function and its classical derivatives using Haar basis functions. Moreover, error bounds in the approximation of fractional integrals and the fractional derivatives are derived, which depend on the index J of the approximation space V J and the fractional order α . A neural network problem modeled by a system of nonlinear fractional differential equations is also solved using the proposed method. The numerical results show that the proposed numerical approach is efficient.

Topics & Concepts

MathematicsFractional calculusHaarHaar waveletBoundary value problemWaveletApplied mathematicsApproximation errorMathematical analysisFunction (biology)Wavelet transformDiscrete wavelet transformComputer scienceEvolutionary biologyBiologyArtificial intelligenceFractional Differential Equations SolutionsIterative Methods for Nonlinear EquationsNonlinear Differential Equations Analysis