| Authors: | Đukić, Marija Tepavčević, Andreja |
Affiliations: | Mathematical Institute of the Serbian Academy of Sciences and Arts | Title: | Poset valued intuitionistic preference relations | Journal: | Computational Intelligence and Mathematics for Tackling Complex Problems | Series/Report no.: | Studies in Computational Intelligence | Volume: | 819 | First page: | 67 | Last page: | 74 | Issue Date: | 1-Jan-2020 | ISBN: | 978-3-030-16023-4 | ISSN: | 1860-949X | DOI: | 10.1007/978-3-030-16024-1_9 | Abstract: | It is known that in every finite poset each element can be presented as a join of completely join-irreducible elements. This representation is used here to justify a new notion of poset-valued reciprocal (preference) relations and also the intuitionistic version of this definition. Join-irreducible elements would represent pieces of information representing grade of preference in this framework. 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 the top element T and the bottom element B (T representing the total preference). Some properties are proved and connections with previous definitions are shown. It is demonstrated that the new definition is in a sense more general (and in some aspects more convenient) than previous ones. |
Keywords: | Intuitionistic preference | Join irreducible element | Poset | Publisher: | Springer Link | Project: | Development of methods of computation and information processing: theory and applications Provincial Secretariat for Higher Education and Scientific Research, Grant no. 142-451-3642/2017/01 |
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