Narrow Results

In this paper we deal with the study of triangle functions defined on the class , of distance distribution functions with range in , where n is a given positive integer. This study can be formulated in terms of triangular conorms on the set Σ_n of non-decreasing n-lists (a₁,…, a_n) ∊ [0, +∞]ⁿ equipped with the natural (product) order. Using triangular conorms on [0, +∞] and triangular norms on {0, 1, …, n} we describe different classes of appropriate triangular conorms on [0, +∞]ⁿ.

This paper introduces the notion of interval migrative functions. Also, we show a necessary and sufficient condition to a interval function to be migrative and that the interval canonical representation of a migrative function f (in the usual sense) is an interval migrative function and preserves some properties of f.