Transitivity of some uniformities on fuzzy sets
Abstract
Given a uniform space (X, U), we denote by F(X) to the family of all normal upper semicontinuous fuzzy sets u X [0,1] with compact support. In this paper, we study transitivity on some uniformities on F(X): the level-wise uniformity U∞, the Skorokhod uniformity U0, and the sendograph uniformity US. If f (X, U) (X, U) is a continuous function, we mainly characterize when the induced dynamical systems f (F(X), U∞) (F(X), U∞), f (F(X), U0) (F(X), U0) and f (F(X), US) (F(X), US) are transitive, where f is the Zadeh's extension of f.
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