Add to ORKGAbstract — In analogy to the representation of the standard probabilistic average as an expected value of a random variable, a geometric approach to aggregation is proposed. Several properties of such aggregation operators are investigated, and the relationship with distinguished classes of aggregation operators is discussed. Key words — Aggregation operator, fuzzy measure, Choquet integral, triangular norm Submitted for publicatio
Lipschitzian and kernel aggregation operators with respect to the natural T-indistinguishability ope...
summary:Standard Möbius transform evaluation formula for the Choquet integral is associated with the...
Aggregation operators have been used and studied for a long time. More than ten different types of m...
The natural properties of the aggregation operators and the most elementary ones are the idempotence...
summary:In a fuzzy measure space we study aggregation operators by means of the hypographs of the me...
We consider the aggregation operators which are comonotone- \oplus additive.The main result is a re...
In a fuzzy measure space we study aggregation operators by means of the hypographs of the measurable...
This chapter provides a review of various techniques for identification of weights in generalized me...
Aggregation is a mathematical process consisting in the fusion of a set of values into a unique one ...
The aim of this paper is to shed some light on the use of fuzzy measures and integrals as aggregatio...
A complex fuzzy set is an extension of the traditional fuzzy set, where traditional [0,1]-valued mem...
A complex fuzzy set is an extension of the traditional fuzzy set, where traditional [0,1]-valued mem...
Aggregation function is an important component in an information aggregation or information fusion s...
Abstract. Mathematically considered, a Triangular Norm is a kind of binary operation frequently used...
Lipschitzian and kernel aggregation operators with respect to the natural T-indistinguishability ope...
Lipschitzian and kernel aggregation operators with respect to the natural T-indistinguishability ope...
summary:Standard Möbius transform evaluation formula for the Choquet integral is associated with the...
Aggregation operators have been used and studied for a long time. More than ten different types of m...
The natural properties of the aggregation operators and the most elementary ones are the idempotence...
summary:In a fuzzy measure space we study aggregation operators by means of the hypographs of the me...
We consider the aggregation operators which are comonotone- \oplus additive.The main result is a re...
In a fuzzy measure space we study aggregation operators by means of the hypographs of the measurable...
This chapter provides a review of various techniques for identification of weights in generalized me...
Aggregation is a mathematical process consisting in the fusion of a set of values into a unique one ...
The aim of this paper is to shed some light on the use of fuzzy measures and integrals as aggregatio...
A complex fuzzy set is an extension of the traditional fuzzy set, where traditional [0,1]-valued mem...
A complex fuzzy set is an extension of the traditional fuzzy set, where traditional [0,1]-valued mem...
Aggregation function is an important component in an information aggregation or information fusion s...
Abstract. Mathematically considered, a Triangular Norm is a kind of binary operation frequently used...
Lipschitzian and kernel aggregation operators with respect to the natural T-indistinguishability ope...
Lipschitzian and kernel aggregation operators with respect to the natural T-indistinguishability ope...
summary:Standard Möbius transform evaluation formula for the Choquet integral is associated with the...
Aggregation operators have been used and studied for a long time. More than ten different types of m...