Associativity of two-place functions generated by left continuous monotone functions and other properties

Abstract

This article introduces a weak pseudo-inverse of a monotone function, which is applied to characterize the associativity of a two-place function T: [0,1]2→ [0,1] defined by T(x,y)=t[-1](F(t(x),t(y))) where F:[0,∞]2→[0,∞] is an associative function with neutral element in [0,∞], t: [0,1]→ [0,∞] is a left continuous monotone function and t[-1]:[0,∞]→[0,1] is the weak pseudo-inverse of t. It shows that the associativity of the function T depends only on properties of the range of t. Moreover, it investigates the idempotence, the limit property, the conditional cancellation law and the continuity of the function T, respectively.

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