The paper deals with integration of fuzzy-number-valued functions in n dimensions.The McShane, Aumann and Henstock integrals of fuzzy-number-valued functions in n dimensions are investigated, those built with the classical real Analysis. The integrability of fuzzy-number-valued functions in n dimensions are characterized by the integrability of real-valued functions. The relationships between the McShane, Henstock, Aumann and Kaleva integrals of fuzzy-number-valued functions in n dimensions are founded.The convergence theorems for the Kaleva, McShane, Aumann and Henstock integrals of fuzzy-number-valued functions in n dimensions are built.
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