This paper deals with a characterization of a class of aggregation operators. This class concerns operators which are symmetric, increasing, stable for the same positive linear transformations and present a property close to the bisymmetry property: the ordered bisymmetry property. It is proved that the class investigated contains exactly the ordered weighted averaging operators (OWA) introduced by Yager in 1988
In this paper, we discuss the generalization of concavity on the subclass of the set of all membersh...
Abstract We investigate a class of aggregation operators : the well-known mean values. Kolmogorof
A key component of many decision making processes is the aggregation step, whereby a set of numbers ...
peer reviewedThis paper deals with the characterization of some classes of aggregation functions oft...
This paper deals with the characterization of some classes of aggregation functions often used in mu...
We characterize the class of ordinaly stable, continuous, neutral (symmetric) and monotonic aggregat...
This paper deals with a characterization of a class of aggregation operators. This class concerns op...
peer reviewedThis paper deals with the characterization of two classes of monotonic and neutral (MN)...
peer reviewedWe investigate the aggregation phase of multicriteria decision making procedures. Chara...
A general characterization result of projective aggregation functions is shown, the proof of which m...
In this paper we analyze the notion of family of aggregation operators (FAO), also refereed to as ex...
This paper describes an approach to pointwise construction of general aggregation operators, based o...
summary:It has been lately made very clear that aggregation processes can not be based upon a unique...
This paper examines disjunctive aggregation operators used in various recommender systems. A specifi...
The natural properties of the aggregation operators and the most elementary ones are the idempotence...
In this paper, we discuss the generalization of concavity on the subclass of the set of all membersh...
Abstract We investigate a class of aggregation operators : the well-known mean values. Kolmogorof
A key component of many decision making processes is the aggregation step, whereby a set of numbers ...
peer reviewedThis paper deals with the characterization of some classes of aggregation functions oft...
This paper deals with the characterization of some classes of aggregation functions often used in mu...
We characterize the class of ordinaly stable, continuous, neutral (symmetric) and monotonic aggregat...
This paper deals with a characterization of a class of aggregation operators. This class concerns op...
peer reviewedThis paper deals with the characterization of two classes of monotonic and neutral (MN)...
peer reviewedWe investigate the aggregation phase of multicriteria decision making procedures. Chara...
A general characterization result of projective aggregation functions is shown, the proof of which m...
In this paper we analyze the notion of family of aggregation operators (FAO), also refereed to as ex...
This paper describes an approach to pointwise construction of general aggregation operators, based o...
summary:It has been lately made very clear that aggregation processes can not be based upon a unique...
This paper examines disjunctive aggregation operators used in various recommender systems. A specifi...
The natural properties of the aggregation operators and the most elementary ones are the idempotence...
In this paper, we discuss the generalization of concavity on the subclass of the set of all membersh...
Abstract We investigate a class of aggregation operators : the well-known mean values. Kolmogorof
A key component of many decision making processes is the aggregation step, whereby a set of numbers ...