Abstract
Continuing our categorical study of L-fuzzy extensions of formal concept analysis, we provide a representation theorem for the category of L-Chu correspondences between L-formal contexts and prove that it is equivalent to the category of completely lattice L-ordered sets.
Citation
Please, cite this work as:
[KO12] O. Kridlo and M. Ojeda-Aciego. “Linking L-Chu Correspondences and Completely Lattice L-ordered Sets”. In: Proceedings of The Ninth International Conference on Concept Lattices and Their Applications, Fuengirola (Málaga), Spain, October 11-14, 2012. Ed. by L. Szathmary and U. Priss. Vol. 972. CEUR Workshop Proceedings. CEUR-WS.org, 2012, pp. 233-244. URL: https://ceur-ws.org/Vol-972/paper20.pdf.
@InProceedings{Kridlo2012a,
author = {Ondrej Kridlo and Manuel Ojeda-Aciego},
booktitle = {Proceedings of The Ninth International Conference on Concept Lattices and Their Applications, Fuengirola (M{'{a}}laga), Spain, October 11-14, 2012},
title = {Linking L-Chu Correspondences and Completely Lattice L-ordered Sets},
year = {2012},
editor = {Laszlo Szathmary and Uta Priss},
pages = {233–244},
publisher = {CEUR-WS.org},
series = {{CEUR} Workshop Proceedings},
volume = {972},
abstract = {Continuing our categorical study of L-fuzzy extensions of formal concept analysis, we provide a representation theorem for the
category of L-Chu correspondences between L-formal contexts and prove that it is equivalent to the category of completely lattice L-ordered sets.},
bibsource = {dblp computer science bibliography, https://dblp.org},
biburl = {https://dblp.org/rec/conf/cla/KridloO12.bib},
timestamp = {Fri, 10 Mar 2023 00:00:00 +0100},
url = {https://ceur-ws.org/Vol-972/paper20.pdf},
}