超级关系的超级和超级产物

Á. Száz
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引用次数: 3

摘要

如果R是X到Y上的关系,U是P (X)到Y上的关系,V是P (X)到P (Y)上的关系,那么我们就说R是普通关系,U是超关系,V是X到Y上的超关系。在Emilia Przemska关于开闭集统一处理的一个巧妙思想的启发下,我们将引入并研究超关系的四个合理的积关系概念。特别地,对于X上的任意两个超关系U和V,我们定义了两个超关系U * V和U * V,以及X上的两个超关系U★V和U * V,使得:(U*V)(A)=(A∪U(A))∩V(A),(U*V)(A)=(A∩U(A))∪U(A) \begin{array}{*{20}{l}} {(U*V)(A) = (A\mathop \cup \nolimits^ U(A))\mathop \cap \nolimits^ V(A),}\\ {(U*V)(A) = (A\mathop \cap \nolimits^ U(A))\mathop \cup \nolimits^ U(A)} \end{array}和(U★V)(A)= {b白日梦:(u * v)(a)},(U*V)(A)= {b蔓蔓性:(u∩v)(a)贝蔓蔓性(u∩v)(a)}\begin{array}{*{20}{l}} {(UV)(A) = \{ B \subseteq X:\,(U*V)(A) \subseteq B \subseteq (U*V)(A)\} ,}\\ {(U*V)(A) = \{ B \subseteq X:\,(U\mathop \cap \nolimits^ V)(A) \subseteq B \subseteq (U\mathop \cup \nolimits^ V)(A)\} } \end{array}对于所有的A (X),利用运算∩在∪上的分布性,我们可以立即得到U*V≠U*V,如果U≠V,那么我们也可以得到U*V = U*V。最简单的情况是,U是X上的一个内关系,V是所有A (X)定义为V(A) = U(Ac)c的关联闭包关系。
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Super and Hyper Products of Super Relations
Abstract If R is a relation on X to Y, U is a relation on P (X) to Y, and V is a relation on P (X) to P (Y), then we say that R is an ordinary relation, U is a super relation, and V is a hyper relation on X to Y. Motivated by an ingenious idea of Emilia Przemska on a unified treatment of open- and closed-like sets, we shall introduce and investigate here four reasonable notions of product relations for super relations. In particular, for any two super relations U and V on X, we define two super relations U * V and U * V, and two hyper relations U ★ V and U * V on X such that : (U*V)(A)=(A∪U(A))∩V(A),(U*V)(A)=(A∩U(A))∪U(A) \begin{array}{*{20}{l}} {(U*V)(A) = (A\mathop \cup \nolimits^ U(A))\mathop \cap \nolimits^ V(A),}\\ {(U*V)(A) = (A\mathop \cap \nolimits^ U(A))\mathop \cup \nolimits^ U(A)} \end{array} and (U★V)(A)={B⊆X: (U*V)(A)⊆B⊆(U*V)(A)},(U*V)(A)={B⊆X: (U∩V)(A)⊆B⊆(U∪V)(A)}\begin{array}{*{20}{l}} {(UV)(A) = \{ B \subseteq X:\,(U*V)(A) \subseteq B \subseteq (U*V)(A)\} ,}\\ {(U*V)(A) = \{ B \subseteq X:\,(U\mathop \cap \nolimits^ V)(A) \subseteq B \subseteq (U\mathop \cup \nolimits^ V)(A)\} } \end{array} for all A ⊆ X. By using the distributivity of the operation ∩ over ∪, we can at once see that U * V ⊆ U * V. Moreover, if U ⊆ V, then we can also see that U * V = U * V. The most simple case is when U is an interior relation on X and V is the associated closure relation defined such that V (A) = U (Ac)c for all A ⊆ X.
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Tatra Mountains Mathematical Publications
Tatra Mountains Mathematical Publications Mathematics-Mathematics (all)
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