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本文在平面上解决了StevenRLay在 [1 ]中提出的开放性问题“什么样的凸集存在唯一的最小凸生成子集” ,给出并证明了“平面上的凸集存在唯一的最小凸生成子集”的一个充要条件 .同时证明了En 中的开集一定不存在最小凸生成集 . 相似文献
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首先探讨了由一个直觉模糊子集生成格的直觉模糊理想的问题,给出了生成直觉模糊理想的刻画;其次研究了在经典格同态意义下,直觉模糊理想的像以及逆像,得到了格同态与生成直觉模糊理想的关系. 相似文献
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借助于范畴论中的伴随概念,本文提出用极性模糊伴随三元组生成模糊形式概念分析的基本框架。继而借用L-粗糙算子,构建粗糙模糊形式概念分析理论。这一新框架与已有的多伴随框架不同:对象集与属性集的模糊子集被建立在同一个真值结构之上;从两个模糊子集之间伴随三元组诱导的模糊伽罗华连接,变为三个模糊子集之间极性诱导的模糊伴随三元组。从而将多伴随框架中真值结构与模糊子集之间过于复杂的设定与伴随关系简化。基于以上结果,本文构造了一个病毒传播-医疗资源储备策略实例,用以论证极性模糊伴随三元组框架的优势以及应用前景。 相似文献
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BCI-代数的余模糊理想 总被引:1,自引:0,他引:1
孟彪龙 《纯粹数学与应用数学》2008,24(2)
在BCI-代数中引入了余模糊理想的概念,讨论了它的某些性质,研究了BCI-代数的模糊理想和余模糊理想的关系.特别是,给出了一个如何由一个模糊子集生成一个余模糊理想和闭余模糊理想的过程. 相似文献
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几乎K-Chebyshev子集 总被引:2,自引:0,他引:2
1978年,Kasing Lau证明了自反局一致凸空间的任何闭子集都是几乎Chebyshev子集,从而解决了Steckin在1963年提出的问题。本文研究了自反K局一致凸空间的类似性质。证明了自反的K局一致凸空间的任何闭子集都是几乎K-Chebyshev子集。 相似文献
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1978年,Kasing Lau证明了自反局一致凸空间的任何闭子集都是几乎Chebyshev子集,从而解决了Steckin在1963年提出的问题。本文研究了自反K局一致凸空间的类似性质。证明了自反的K局一致凸空间的任何闭子集都是几乎K-Chebyshev子集。 相似文献
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本文研究一般化凸空间上的连续选择定理.利用在D■X的条件下,一般化凸空间(X,D;Γ)上Γ-凸子集的概念,得到了两类一般化凸空间之间,以及φ映射和Γ-凸映射之间的关系,并且得到了一个连续选择定理.本文推广了一般化凸空间上凸子集的概念. 相似文献
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Azriel Rosenfeld 《Fuzzy Sets and Systems》1984,13(3):241-246
In pattern recognition one often wants to measure geometric properties of imprecisely defined subsets of an image. This paper proposes definitions of intrinsic and extrinsic diameter for fuzzy subsets which reduce to the ordinary definitions when the subsets are crisp. We also define height and width for a fuzzy subset and show how they relate to the area (i.e., integral of membership). For convex fuzzy subsets the intrinsic diameter cannot exceed the extrinsic diameter, but it can be smaller. Finally, for piecewise constant convex fuzzy subsets the intrinsic diameter cannot exceed half the fuzzy perimeter, but this need not be true in the nonconvex case. 相似文献
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In this paper, the possibility to perform easily most of the extended n-ary operations on fuzzy subsets of the real line is shown. A general algorithm is given. These results are particularized for usual operations such as addition, subtraction, multiplication, division, ‘max’ and ‘min’ operations for normalized convex fuzzy subsets of the real line, i.e. fuzzy numbers. A three parameters representation for fuzzy numbers is shown to be very convenient to perform usual operations. Lastly, interpretative comments about fuzzy real algebra are given and possible applications pointed out. 相似文献
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Elie Sanchez 《Fuzzy Sets and Systems》1984,12(3):237-248
Assuming that 1 is any operation defined on a product set X × Y and taking values on a set Z, it can be extended to fuzzy sets by means of Zadeh's extension principle. Given a fuzzy subset C of Z, it is here shown how to solve the equation (or ) when a fuzzy subset A of X (or a fuzzy subset B of Y) is given. The methodology we provide includes, as a special case, the resolution of fuzzy arithmetical operations, i.e. when 1 stands for +, ?, × or ÷, extended to fuzzy numbers (fuzzy subsets of the real line). The paper is illustrated with several examples in fuzzy arithmetic. 相似文献
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The uniqueness and existence of restricted Chebyshev center with respect to arbitrary subset are investigated. The concept
of almost Chebyshev sets with respect to bounded subsets is introduced. It is proved that each closed subset in a reflexive
locally uniformly convex (uniformly convex, respectively) Banach space is an almost Chebyshev subset with respect to compact
convex subsets (bounded convex subsets and bounded subsets, respectively).
Project supported by the National Natural Science Foundation of China, Natural Science Foundation of Zhejiang Province, and
the State Major Key Project for Basic Researchers of China. 相似文献
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利用n维模糊集截集理论和模糊点与n维模糊集的邻属关系,并利用n+1-值Lukasiewicz蕴涵,首先给出(α,β)-n维凸模糊集的定义,然后对(∈,∈)-n维凸模糊集和(∈,∈∨q)-n维凸模糊集这两种非常有意义的n维凸模糊集进行了讨论,最后得到了一些有意义的结果。这将为n维凸模糊分析理论研究打下基础。 相似文献
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