Abstract
Formal concept analysis has become an important and appealing research topic. There exist a number of different fuzzy extensions of formal concept analysis and of its representation theorem, which gives conditions for a complete lattice in order to be isomorphic to a concept lattice. In this paper we concentrate on the study of operational properties of the mappings α and β required in the representation theorem.
Citation
Please, cite this work as:
[MO09] J. Medina and M. Ojeda-Aciego. “On the Representation Theorem of Multi-Adjoint Concept Lattices”. In: Proceedings of the Joint 2009 International Fuzzy Systems Association World Congress and 2009 European Society of Fuzzy Logic and Technology Conference, Lisbon, Portugal, July 20-24, 2009. Ed. by J. P. Carvalho, D. Dubois, U. Kaymak and J. M. da Costa Sousa. 2009, pp. 1091-1095. URL: http://www.eusflat.org/proceedings/IFSA-EUSFLAT_2009/pdf/tema_1091.pdf.
@InProceedings{Medina2009a,
author = {Jes{’u}s Medina and Manuel Ojeda-Aciego},
booktitle = {Proceedings of the Joint 2009 International Fuzzy Systems Association World Congress and 2009 European Society of Fuzzy Logic and Technology Conference, Lisbon, Portugal, July 20-24, 2009},
title = {On the Representation Theorem of Multi-Adjoint Concept Lattices},
year = {2009},
editor = {Jo~ao Paulo Carvalho and Didier Dubois and Uzay Kaymak and Jo~ao Miguel {da Costa Sousa}},
pages = {1091–1095},
abstract = {Formal concept analysis has become an important and appealing research topic. There exist a number of different fuzzy extensions of formal concept analysis and of its representation theorem, which gives conditions for a complete lattice in order to be isomorphic to a concept lattice. In this paper we concentrate on the study of operational properties of the mappings α and β required in the representation theorem.},
bibsource = {dblp computer science bibliography, https://dblp.org},
biburl = {https://dblp.org/rec/conf/eusflat/MedinaO09.bib},
timestamp = {Thu, 07 Jan 2021 00:00:00 +0100},
url = {http://www.eusflat.org/proceedings/IFSA-EUSFLAT_2009/pdf/tema_1091.pdf},
}