A STUDY ON INTERVAL-VALUED HESITANT FUZZY SET IN RESIDUATED LATTICES

In order to exactly quantify the decision maker's opinions in the real decision making problems, interval-valued hesitant fuzzy set (IVHFS), to permit an element's membership degree to be a set of several possible interval values, was introduced by Chen, Xu and Xia. In this paper, we continue the study on interval-valued hesitant fuzzy set in a residuated lattice and apply the interval-valued hesitant fuzzy set to the filter theory of a general residuated lattice; the notions of interval-valued hesitant fuzzy (implicative, positive implicative, MV, regular) filters are firstly introduced. Consequently, their properties, and sonic equivalent characterizations of these interval-valued hesitant fuzzy filters are derived. Finally, the relations among these interval-valued hesitant fuzzy filters are investigated.