- 作者:C. Torres-Blanc ; S. Cubillo ; E.E. Castiñ ; eira
- 关键词:Atanassov’ ; s intuitionistic fuzzy sets ; MDHP7-1&_mathId=mml27&_user=10&_cdi=5643&_pii=S0020025509002886&_rdoc=6&_issn=00200255&_acct=C000050221&_
- 刊名:Information Sciences
- 出版年:2010
- 出版时间:15 March 2010
- 年:2010
- 卷:180
- 期:6
- 页码:834-845
- 全文大小:744 K
In [S. Cubillo, E. Castiñeira, Contradiction in intuitionistic fuzzy sets, in: Proceedings of the Conference IPMU’2004, Perugia, Italy, 2004, pp. 2180–2186] we defined contradictory and -contradictory Atanassov intuitionistic sets, where we established that two sets A and B are -contradictory, with respect to a given intuitionistic negation , if A implies , and are contradictory if they are -contradictory for some negation .
The purpose of this article is to thoroughly examine the model for measuring contradiction between two Atanassov intuitionistic fuzzy sets irrespective of a fixed negation, proposed in [C. Torres-Blanc, E.E. Castiñeira, S. Cubillo, Measuring contradiction between two AIFS, in: Proceedings of the Eighth International FLINS Conference, Madrid, Spain, 2008, pp. 253–258], and also to introduce a mathematical model to measure -contradiction between sets, where is an intuitionistic negation. First, we justify and determine the minimum axioms that a function must satisfy to be able to be used as a measure of contradiction or a measure of -contradiction. Also, we introduce some early examples of valid functions that conform to the model. Then, we establish the conditions for these measures to be continuous from below or continuous from above. Finally, we build families of contradiction and -contradiction measures, establishing how they are relate to each other, and we look at how they behave with respect to continuity.
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