In this note, we continue the works in the paper [Some properties of L-fuzzy approximation spaces on bounded integral residuated lattices", Information Sciences, 278, 110-126, 2014]. For a complete involutive residuated lattice, we show that the L-fuzzy topologies generated by a reflexive and transitive L-relation satisfy (TC) L or (TC) R axioms and the L-relations induced by two L-fuzzy topologies, which are generated by a reflexive and transitive L-relation, are all the original L-relation; and give out some conditions such that the L-fuzzy topologies generated by two L-relations, which are induced by an L-fuzzy topology, are all the original L-fuzzy topology.
| Published in | Automation, Control and Intelligent Systems (Volume 4, Issue 2) |
| DOI | 10.11648/j.acis.20160402.11 |
| Page(s) | 10-14 |
| Creative Commons |
This is an Open Access article, distributed under the terms of the Creative Commons Attribution 4.0 International License (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted use, distribution and reproduction in any medium or format, provided the original work is properly cited. |
| Copyright |
Copyright © The Author(s), 2016. Published by Science Publishing Group |
Involutive Residuated Lattice, L-relation, L-fuzzy Topology, L-fuzzy Approximation Space
| [1] | K. Blount and C. Tsinakis, “The structure of residuated lattices”, International Journal of Algebra and Computation, 13, 437-461, 2003. |
| [2] | Z. W. Li and R. C. Cui, “Similarity of fuzzy relations based on fuzzy topologies induced by fuzzy rough approximation operators”, Information Sciences, 305, 219-233, 2015. |
| [3] | L. Z. Liu and K. T. Li, “Boolean filters and positive implicative filters of residuated lattices”, Information Sciences, 177, 5725-5738, 2007. |
| [4] | Y. Liu and Y. Lin, “Intuitionistic fuzzy rough set model based on conflict distance and applications”, Applied Soft Computing, 31, 266-273, 2015. |
| [5] | Y. M. Liu and M. K. Luo, “Fuzzy Topology”, World Scientific Publishing, Singapore, 1997. |
| [6] | Y. Ouyang, Z. D. Wang and H. P. Zhang, “On fuzzy rough sets based on tolerance relations”, Information Sciences, 180, 532-542, 2010. |
| [7] | D. W. Pei, “A generalised model of fuzzy rough sets”, International Journal of General Systems, 34, 603-613, 2005. |
| [8] | K. Y. Qin and Z. Pei, “On the topogical properties of fuzzy roughsets”, Fuzzy Sets and Systems, 151, 601-613, 2005. |
| [9] | A. M. Radzikowska and E. E. Kerre, “Fuzzy rough sets based onresiduated lattices”, in: J. F. Peter et al. (Eds.), Transactions on Rough Sets II, LNCS 3135, 278-296, 2004. |
| [10] | Z. D. Wang and J. X. Fang, “On v-filters and normal v-filters of a residuated lattice with a weak vt-operator”, Information Sciences, 178, 3465-3473, 2008. |
| [11] | Z. D. Wang and X. J. Liu, “L-topological spaces based on residuated lattices”, Advances in Pure Mathematics, 2, 41-44, 2012. |
| [12] | Z. D. Wang, Y. Wang and K. M. Tang, “Some properties of L-fuzzy approximation spaces on bounded integral residuatedlattices”, Information Sciences, 278, 110-126, 2014. |
| [13] | W. Z. Wu, Y. H. Xu, M. W. Shao and G. Y. Wang, “Axiomatic characterizations of (S, T)-fuzzy rough approximation operators”, Information Sciences, 334–335, 17-43, 2016. |
| [14] | X. H. Zhang, J. H. Dai and Y. C. Yu, “On the union and intersection operations of rough sets based on various approximation spaces”, Information Sciences, 292, 214-229, 2015. |
| [15] | N. L. Zhou and B. Q. Hu, “Axiomatic approaches to rough approximation operators on complete completely distributive lattices”, Information Sciences, 348, 227-242, 2016. |
APA Style
Yuan Wang, Keming Tang, Zhudeng Wang. (2016). Notes on “Some Properties of L-fuzzy Approximation Spaces on Bounded Integral Residuated Lattices”. Automation, Control and Intelligent Systems, 4(2), 10-14. https://doi.org/10.11648/j.acis.20160402.11
ACS Style
Yuan Wang; Keming Tang; Zhudeng Wang. Notes on “Some Properties of L-fuzzy Approximation Spaces on Bounded Integral Residuated Lattices”. Autom. Control Intell. Syst. 2016, 4(2), 10-14. doi: 10.11648/j.acis.20160402.11
AMA Style
Yuan Wang, Keming Tang, Zhudeng Wang. Notes on “Some Properties of L-fuzzy Approximation Spaces on Bounded Integral Residuated Lattices”. Autom Control Intell Syst. 2016;4(2):10-14. doi: 10.11648/j.acis.20160402.11
Share This Article
Twitter
Linked In
Facebook
Copy
Download@article{10.11648/j.acis.20160402.11,
author = {Yuan Wang and Keming Tang and Zhudeng Wang},
title = {Notes on “Some Properties of L-fuzzy Approximation Spaces on Bounded Integral Residuated Lattices”},
journal = {Automation, Control and Intelligent Systems},
volume = {4},
number = {2},
pages = {10-14},
doi = {10.11648/j.acis.20160402.11},
url = {https://doi.org/10.11648/j.acis.20160402.11},
eprint = {https://article.sciencepublishinggroup.com/pdf/10.11648.j.acis.20160402.11},
abstract = {In this note, we continue the works in the paper [Some properties of L-fuzzy approximation spaces on bounded integral residuated lattices", Information Sciences, 278, 110-126, 2014]. For a complete involutive residuated lattice, we show that the L-fuzzy topologies generated by a reflexive and transitive L-relation satisfy (TC) L or (TC) R axioms and the L-relations induced by two L-fuzzy topologies, which are generated by a reflexive and transitive L-relation, are all the original L-relation; and give out some conditions such that the L-fuzzy topologies generated by two L-relations, which are induced by an L-fuzzy topology, are all the original L-fuzzy topology.},
year = {2016}
}
TY - JOUR T1 - Notes on “Some Properties of L-fuzzy Approximation Spaces on Bounded Integral Residuated Lattices” AU - Yuan Wang AU - Keming Tang AU - Zhudeng Wang Y1 - 2016/03/23 PY - 2016 N1 - https://doi.org/10.11648/j.acis.20160402.11 DO - 10.11648/j.acis.20160402.11 T2 - Automation, Control and Intelligent Systems JF - Automation, Control and Intelligent Systems JO - Automation, Control and Intelligent Systems SP - 10 EP - 14 PB - Science Publishing Group SN - 2328-5591 UR - https://doi.org/10.11648/j.acis.20160402.11 AB - In this note, we continue the works in the paper [Some properties of L-fuzzy approximation spaces on bounded integral residuated lattices", Information Sciences, 278, 110-126, 2014]. For a complete involutive residuated lattice, we show that the L-fuzzy topologies generated by a reflexive and transitive L-relation satisfy (TC) L or (TC) R axioms and the L-relations induced by two L-fuzzy topologies, which are generated by a reflexive and transitive L-relation, are all the original L-relation; and give out some conditions such that the L-fuzzy topologies generated by two L-relations, which are induced by an L-fuzzy topology, are all the original L-fuzzy topology. VL - 4 IS - 2 ER -
Email: