Abstract
In this paper, analytical investigations of linear fractio nal order fuzzy differential equations are obtained using a newfound operator method. Fuzzy fractional differential equations (FFDEs) subjected to initial conditions are dissected under the assumptions of generalized Hukuhara differentiability in conjunction with Caputo-type fuzzy fractional derivative. Consequently, all the prospects of fractional differentials of fuzzy-valued functions are de duced and discussed in detail under the notion of Caputo-type fuzzy fractional differentiability (CFH-differentiability). Moreover, the novel method is illust rated on constructed systems of FFDEs and convex combination of r -level solutions for each system is measured, explicitly.
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