We first define an accuracy function of hesitant fuzzy elements (HFEs) and develop a new method to compare two HFEs. Then, based on Einstein operators, we give some new operational laws on HFEs and some desirable properties of these operations. We also develop several new hesitant fuzzy aggregation operators, including the hesitant fuzzy Einstein weighted geometric (HFEWGε) operator and the hesitant fuzzy Einstein ordered weighted geometric (HFEWGε) operator, which are the extensions of the weighted geometric operator and the ordered weighted geometric (OWG) operator with hesitant fuzzy information, respectively. Furthermore, we establish the connections between the proposed and the existing hesitant fuzzy aggregation operators and discuss various properties of the proposed operators. Finally, we apply the HFEWGεoperator to solve the hesitant fuzzy decision making problems.
In this paper, a hesitant fuzzy multiple attribute group decision making problem where there exists a prioritization relationship over the attributes and decision makers is studied. First, the generalized hesitant fuzzy prioritized Einstein weighted average operator is proposed. Then, some special cases and their desirable properties are investigated. Furthermore, the procedure of group decision making based on the proposed operators is given under hesitant fuzzy environment. Finally, a practical example is provided to illustrate the developed approach.
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