However, many fuzzy mappings are not convex. People start to generalize the convexity of fuzzy mapping in different ways.
但许多模糊映射并不具有凸性,所以人们又对模糊映射的凸性进行了各种推广。
Does research in a common fixed point theorem of fuzzy mappings in inequality conditions and the cut set is the nonempty closed bounded subsets of, while is complete metric space.
研究了在完备度量空间中一对模糊映象满足一些特定不等式条件,以及当其截集是中非空有界闭集时,该对模糊映象的公共不动点的存在性问题。
The notions of subgradient, subdifferential, differential with respect to convex fuzzy mappings are investigated, which provides the basis of the theory of fuzzy extremum problems.
最后对凸模糊映射的次梯度、次微分和微分等概念进行了研究,为模糊极值理论打下了基础。
Making use of theories of nested sets, we extend these mappings on fuzzy power sets and obtain maximal and minimal extension principles.
本文利用集合套理论,将这四种映射扩展到模糊幂集之间的映射。
The fixed point theorems for mappings of contractive type and locally contractive type on WF-fuzzy metric Spaces, which extend several important fixed point theorems, are established.
在WF -模糊度量空间中建立压缩型和局部压缩型映射的不动点理论,推广一些重要的不动点定理。
We utilize the results in Chapter 2 and Chapter 3 to prove the fixed point theorems and several corollaries for complex mappings or single mapping on fuzzy metric Spaces.
利用第二、第三章的结果证明了模糊度量空间上相应的复合映射的不动点定理和几个单一映射的不动点定理。
The purpose of this paper is to introduce a new class of general mixed quasi-variational inclusions with fuzzy set-valued mappings.
本文引入一类新的带有模糊集值映象的一般混合拟变分包。
The concept of L-fuzzy perfect mappings based on the N-compactness is introduced. We show that the L-fuzzy perfect mappings are multiplicative.
本文以良紧性理论为基础引入了L-不分明完备映射的概念,证明了这种映射是可乘的。
Finally, some concrete forms of fuzzy extension mappings have been given by using multi factorial functions, especially variable dimension multi factorial functions series.
最后,利用综合函数,特别是变维综合函数列,给出了扩展原理的一些具体形式。
Finally, some concrete forms of fuzzy extension mappings have been given by using multi factorial functions, especially variable dimension multi factorial functions series.
最后,利用综合函数,特别是变维综合函数列,给出了扩展原理的一些具体形式。
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