On the existence of generalized weak solutions to discontinuous fuzzy differential equations

In this paper, by means of replacing the Lebesgue integrability of support functions with its Henstock integrability, the definitions of the Henstock-Pettis integral of n-dimensional fuzzy-number-valued functions are defined. In addition, the con- trolled convergence theorems for such integrals are considered. As the applications of these integrals, we provide some existence theorems of generalized weak solutions to initial value problems for the discontinuous fuzzy differential equations under the strong GH-differentiability.