Litcius/Paper detail

An adaptive finite element method for Riesz fractional partial integro-differential equations

E. Adel, I. L. El‐Kalla, A. Elsaid, M. Sameeh

2023Mathematical sciences16 citationsDOIOpen Access PDF

Abstract

Abstract The Riesz fractional derivative has been employed to describe the spatial derivative in a variety of mathematical models. In this work, the accuracy of the finite element method (FEM) approximations to Riesz fractional derivative was enhanced by using adaptive refinement. This was accomplished by deducing the Riesz derivatives of the FEM bases to work on non-uniform meshes. We utilized these derivatives to recover the gradient in a space fractional partial integro-differential equation in the Riesz sense. The recovered gradient was used as an a posteriori error estimator to control the adaptive refinement scheme. The stability and the error estimate for the proposed scheme are introduced. The results of some numerical examples that we carried out illustrate the improvement in the performance of the adaptive technique.

Topics & Concepts

MathematicsFinite element methodFractional calculusPartial differential equationEstimatorRiesz potentialPartial derivativeRiesz transformDerivative (finance)Applied mathematicsA priori and a posterioriMathematical analysisPhysicsEpistemologyPhilosophyEconomicsStatisticsThermodynamicsFinancial economicsFractional Differential Equations SolutionsNumerical methods in engineeringAdvanced Numerical Methods in Computational Mathematics
An adaptive finite element method for Riesz fractional partial integro-differential equations | Litcius