Abstract
The modeling of fuzzy fractional integro-differential equations is a very significant matter in engineering and applied sciences. This paper presents a novel treatment algorithm based on utilizing the fractional residual power series (FRPS) method to study and interpret the approximated solutions for a class of fuzzy fractional Volterra integro-differential equations of order 0<β≤1 which are subject to appropriate symmetric triangular fuzzy conditions under strongly generalized differentiability. The proposed algorithm relies upon the residual error concept and on the formula of generalized Taylor. The FRPS algorithm provides approximated solutions in parametric form with rapidly convergent fractional power series without linearization, limitation on the problem’s nature, and sort of classification or perturbation. The fuzzy fractional derivatives are described via the Caputo fuzzy H-differentiable. The ability, effectiveness, and simplicity of the proposed technique are demonstrated by testing two applications. Graphical and numerical results reveal the symmetry between the lower and upper r-cut representations of the fuzzy solution and satisfy the convex symmetric triangular fuzzy number. Notably, the symmetric fuzzy solutions on a focus of their core and support refer to a sense of proportion, harmony, and balance. The obtained results reveal that the FRPS scheme is simple, straightforward, accurate and convenient to solve different forms of fuzzy fractional differential equations.
Highlights
Fuzzy theory of fractional differential and integro-differential equations is a new and important branch of fuzzy mathematics
The present work aims to expand the applications of the fractional residual power series (FRPS) technique to determine approximated solutions for a class of fuzzy fractional Volterra integro-differential equations (FFVIDEs) subject to certain fuzzy initial conditions in the following form: β
We show the procedure of FRPS algorithm in order to study and construct analytic-numeric approximated solutions for FFVIDEs (1) and (2) through substituting the expansion of its fractional power series (FPS) among its truncated residual functions
Summary
Fuzzy theory of fractional differential and integro-differential equations is a new and important branch of fuzzy mathematics. The topic of fuzzy fractional integro-differential equations (FFIDEs) has gained the attention of researchers in recent times because it is considered a powerful tool by which to present vague parameters and to handle with their dynamical systems in natural fuzzy environments. It has a great significance in the fuzzy analysis theory and its applications in fuzzy control models, artificial intelligence, quantum optics, measure theory, and atmosphere, etc. The present work aims to expand the applications of the fractional residual power series (FRPS) technique to determine approximated solutions for a class of fuzzy fractional Volterra integro-differential equations (FFVIDEs) subject to certain fuzzy initial conditions in the following form: β. The last section of the current paper is a conclusion
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