On statistical andp-Cesaro convergence of fuzzy numbers

The sequence X = {Ark } of fuzzy numbers is statistically convergent to the fuzzy number 3(o provided that for each e ~ 0 lim l{the number ofk~e} = 0. n In this paper we study a related concept of convergence in which the set {k: k<~n} is replaced by {k: kr-1 -~k<~kr} for some lacunary sequence {k~}

We apply the concept of "graded set" to define several kinds of "graded numbers". We consider the operations, order and convergence for graded numbers. The relationship between these concepts and the corresponding ones for Zadeh's and Hutton's fuzzy numbers gives rise to the definition of "graded co

We show that given a sequence {f,} of uniformly continuous real-valued functions which converges uniformly on a separable Banach space E, the sequence {F,} of fuzzy-number-valued functions on X, induced by f, through Zadeh's extension, converges uniformly with respect to the Hausdorff metrics on Fc~