Affiliation:
1. Department of Mathematical Sciences University of South Africa Pretoria South Africa
2. Department of Mathematics University of Thi‐Qar Nasiriyah Iraq
Abstract
AbstractIn this study, we apply the fractional Laplace variational iteration method (FLVIM), a computer methodology for exploring fractional Navier–Stokes equation solutions. In light of the theory of fixed points and Banach spaces, this paper also explores the uniqueness and convergence of the solution of general fractional differential equations obtained by the suggested method. In addition, the fractional Laplace variational iteration method solution's error analysis is covered. The computational technique also clearly demonstrates the validity and dependability of the suggested method for solving fractional Navier‐Stokes equations. Furthermore, the obtained solutions are a perfect fit with previously established solutions.
Subject
Fluid Flow and Transfer Processes,Condensed Matter Physics
Reference39 articles.
1. Modeling some real phenomena by fractional differential equations
2. Fractional differential equations with a Caputo derivative with respect to a Kernel function and their applications
3. Analysis of fractional multi‐dimensional;Chu Y‐M;NSE,2021
4. On the generalized Navier‐Stokes equations;El‐Shahed M;Appl Math Comput,2004
5. Local fractional function decomposition method for solving inhomogeneous wave equations with local fractional derivative;Wang SQ;Abstr Appl Anal,2014
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