| LΠ是Schweizer-Sklar参数化三角模及其剩余算子的逻辑(英文) |
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| 引用本文: | 王三民,赵彬.LΠ是Schweizer-Sklar参数化三角模及其剩余算子的逻辑(英文)[J].模糊系统与数学,2008,22(6). |
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| 作者姓名: | 王三民 赵彬 |
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| 作者单位: | 陕西师范大学,数学与信息科学学院,西安,陕西,710062 |
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| 基金项目: | Supported by the National Foundation of Natural Sciences of China(Grant No:60663002); the Grant Project of science and technology of The Education Department of Jiangxi Province(Grant No:200618) |
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| 摘 要: | 证明了LΠ是Schweizer-Sklar参数化三角模及其剩余算子的逻辑.这一结果给出了构造两个或多个模糊逻辑的定理的交集的统一语义的一种方法.
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| 关 键 词: | 非经典逻辑 Schweizer-Sklar参数化三角模 UL*逻辑 BL逻辑 LΠ逻辑 LΠ |
LΠ is the Logic of the Schweizer-Sklar Parameterized t-norms and Their Residua |
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| WANG San-min,ZHAO Bin.LΠ is the Logic of the Schweizer-Sklar Parameterized t-norms and Their Residua[J].Fuzzy Systems and Mathematics,2008,22(6). |
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| Authors: | WANG San-min ZHAO Bin |
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| Affiliation: | WANG San-min,ZHAO Bin(College of Mathematics , Information Science,Shaanxi Normal University,Xi\'an 710062,China) |
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| Abstract: | In this paper, we prove that LΠ is the logic of the Schweizer-Sklar parameterized t-norms and their residua. This result presents a method for constructing unified form semantics of the intersection of the theorem sets of two or more fuzzy logics. |
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| Keywords: | Non-lassical logics Schweizer-Sklar parameterized t-norms UL* BL |
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