The associativity property, usually defined for binary functions, can be generalized to functions of a given fixed arity n ⩾ 1 as well as to functions of multiple arities. In this paper, we investigate these two generalizations in the case of polynomial functions over bounded distributive lattices and present explicit descriptions of the corresponding associative functions. We also show that, in this case, both generalizations of associativity are essentially the same
In [6] the authors introduced the notion of quasi-polynomial function as being a mapping f : X n → X...
Two emergent properties in aggregation theory are investigated, namely horizontal maxitivity and com...
For a distributive lattice L, we consider the problem of interpolating functions f : D → L defined o...
peer reviewedThe associativity property, usually defined for binary functions, can be generalized to...
The associativity property, usually defined for binary functions, can be generalized to functions of...
Let L be a bounded distributive lattice. We give several characterizations of those Ln → L mappings ...
Let A and B be arbitrary sets with at least two elements. The arity gap of a function f: A^n \to B i...
peer reviewedWe are interested in representations and characterizations of lattice polynomial functi...
peer reviewedWe are interested in representations and characterizations of lattice polynomial functi...
Référence ArXiV indiquée ci-dessous sous le titre : "A generalization of Goodstein's theorem: interp...
peer reviewedTwo emergent properties in aggregation theory are investigated, namely horizontal maxit...
In this paper we consider an aggregation model f: X1 x ... x Xn --> Y for arbitrary sets X1, ..., Xn...
We give several characterizations of discrete Sugeno integrals over bounded distributive lattices, a...
For a distributive lattice L, we consider the problem of interpolating functions f: D→L defined on a...
We describe the class of polynomial functions which are barycentrically associative over an infinite...
In [6] the authors introduced the notion of quasi-polynomial function as being a mapping f : X n → X...
Two emergent properties in aggregation theory are investigated, namely horizontal maxitivity and com...
For a distributive lattice L, we consider the problem of interpolating functions f : D → L defined o...
peer reviewedThe associativity property, usually defined for binary functions, can be generalized to...
The associativity property, usually defined for binary functions, can be generalized to functions of...
Let L be a bounded distributive lattice. We give several characterizations of those Ln → L mappings ...
Let A and B be arbitrary sets with at least two elements. The arity gap of a function f: A^n \to B i...
peer reviewedWe are interested in representations and characterizations of lattice polynomial functi...
peer reviewedWe are interested in representations and characterizations of lattice polynomial functi...
Référence ArXiV indiquée ci-dessous sous le titre : "A generalization of Goodstein's theorem: interp...
peer reviewedTwo emergent properties in aggregation theory are investigated, namely horizontal maxit...
In this paper we consider an aggregation model f: X1 x ... x Xn --> Y for arbitrary sets X1, ..., Xn...
We give several characterizations of discrete Sugeno integrals over bounded distributive lattices, a...
For a distributive lattice L, we consider the problem of interpolating functions f: D→L defined on a...
We describe the class of polynomial functions which are barycentrically associative over an infinite...
In [6] the authors introduced the notion of quasi-polynomial function as being a mapping f : X n → X...
Two emergent properties in aggregation theory are investigated, namely horizontal maxitivity and com...
For a distributive lattice L, we consider the problem of interpolating functions f : D → L defined o...