Rough Continuity Represented by Intuitionistic Fuzzy Sets

Zoltán Ernő Csajbók

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Paper

Rough Continuity Represented by Intuitionistic Fuzzy Sets

Topics: Approximate Reasoning

In Proceedings of the 12th International Joint Conference on Computational Intelligence - Volume 1: FCTA, 264-274, 2020

Author: Zoltán Ernő Csajbók

Affiliation: Department of Health Informatics, Faculty of Health, University of Debrecen, Sóstói út 2-4, HU-4406 Nyíregyháza, Hungary

Keyword(s): Rough Set Theory, Pawlak’s Approximation Spaces, Rough Real Functions, Fuzzy Sets, Intuitionistic Fuzzy Sets.

Abstract: Studying rough calculus was initiated by Z. Pawlak in his many papers. He originated the concept of rough real functions. Like the notion of continuity in classical analysis, the rough continuity is also a central notion in rough calculus. Relying on the Pawlak’s approximation spaces on the real closed bounded intervals, first, two intuitionistic fuzzy sets are established starting from rough functions. Then, based on them, some necessary and sufficient conditions for the rough continuity in terms of intuitionistic fuzzy set theory will be presented.

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Paper citation in several formats:

Csajbók, Z. (2020). Rough Continuity Represented by Intuitionistic Fuzzy Sets. In Proceedings of the 12th International Joint Conference on Computational Intelligence (IJCCI 2020) - FCTA; ISBN 978-989-758-475-6; ISSN 2184-3236, SciTePress, pages 264-274. DOI: 10.5220/0010164302640274

@conference{fcta20,
author={Zoltán Ernő Csajbók.},
title={Rough Continuity Represented by Intuitionistic Fuzzy Sets},
booktitle={Proceedings of the 12th International Joint Conference on Computational Intelligence (IJCCI 2020) - FCTA},
year={2020},
pages={264-274},
publisher={SciTePress},
organization={INSTICC},
doi={10.5220/0010164302640274},
isbn={978-989-758-475-6},
issn={2184-3236},
}

TY - CONF

JO - Proceedings of the 12th International Joint Conference on Computational Intelligence (IJCCI 2020) - FCTA
TI - Rough Continuity Represented by Intuitionistic Fuzzy Sets
SN - 978-989-758-475-6
IS - 2184-3236
AU - Csajbók, Z.
PY - 2020
SP - 264
EP - 274
DO - 10.5220/0010164302640274
PB - SciTePress