Abstract
This work aims to investigate the analytical solution of a two-dimensional fuzzy fractional-ordered heat equation that includes an external diffusion source factor. We develop the Sawi homotopy perturbation transform scheme (SHPTS) by merging the Sawi transform and the homotopy perturbation scheme. The fractional derivatives are examined in Caputo sense. The novelty and innovation of this study originate from the fact that this technique has never been tested for two-dimensional fuzzy fractional ordered heat problems. We presented two distinguished examples to validate our scheme, and the solutions are in fuzzy form. We also exhibit contour and surface plots for the lower and upper bound solutions of two-dimensional fuzzy fractional-ordered heat problems. The results show that this approach works quite well for resolving fuzzy fractional situations.
Publisher
Public Library of Science (PLoS)
Reference42 articles.
1. Analysis of a fractional-order chaotic system in the context of the Caputo fractional derivative via bifurcation and Lyapunov exponents;N Sene;Journal of King Saud University-Science,2021
2. Novel investigation of fractional-order Cauchy-reaction diffusion equation involving Caputo-Fabrizio operator;M Alesemi;Journal of Function Spaces,2022
3. Geometric and physical interpretation of fractional integration and fractional differentiation;I Podlubny;Fractional Calculus and Applied Analysis,2001
4. Analysis of fractional differential equations;K Diethelm;Journal of Mathematical Analysis and Applications,2002
5. A study of a modified nonlinear dynamical system with fractal-fractional derivative;S Kumar;International Journal of Numerical Methods for Heat & Fluid Flow,2021