Numerical solution of nonlinear fractional Riccati differential equations using compact finite difference method

Document Type : Research Article

Authors

Department of Mathematics, University of Sistan and Baluchestan, Zahedan, Iran.

Abstract

This paper aims to apply and investigate the compact finite difference methods for solving integer-order and fractional-order Riccati differential equations. The fractional derivative in the fractional case is described in the Caputo sense. In solving the Riccati equation, we first approximate first-order derivatives using the approach of compact finite difference. In this way, the system of nonlinear equations is obtained, which solves the Riccati equation. In addition, we examine the convergence analysis of the proposed approach for the fractional and nonfractional cases and prove that the methods are convergent under some suitable conditions. Examples are also given to illustrate the efficiency of our method compared to other methods.
 

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References

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Iranian Journal of Numerical Analysis and Optimization
Volume 12, Issue 3 (Special Issue) - Serial Number 23
On the occasion of the 75th birthday of Professor A. Vahidian and Professor F. Toutounian
November 2022
Pages 585-606

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