We prove that for every set of alternatives there is a poset valued preference whose cut relations are all relations on this domain. We also deal with ...
In decision processes some objects may not be comparable with respect to a preference re- lation, especially if several criteria are considered.
May 3, 2019 · A new notion of poset-valued reciprocal (preference) relations and also the intuitionistic version of this definition.
Abstract: In decision processes some objects may not be comparable with respect to a preference relation, especially if several criteria are considered.
Dec 8, 2024 · We prove that for every set of alternatives there is a poset valued preference whose cut relations are all relations on this domain. We also ...
In decision processes some objects may not be comparable with respect to a preference relation, especially if several criteria are considered.
It is demonstrated that no restriction on type of a poset is needed for developing the intuitionistic approach, except that the poset should be bounded with ...
In decision processes some objects may not be comparable with respect to a preference relation, especially if several criteria are considered.
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Preference relations. Poset valued preference relations. Preferences are binary relations on a set of alternatives. A. Tepavcevic. Characterization of posets ...
We no longer need to impose that every a-cut defines a poset. This approach will then lead to a generalized dimension function showing the generalized dimension ...