共查询到19条相似文献,搜索用时 223 毫秒
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本文引入了代数的局部完备集,FS-局部dcpo,局部稳定映射等概念.主要结果是:以局部Scott连续映射为态射的代数的局部完备集范畴,以局部稳定映射为态射的代数的局部完备集范畴以及以局部Scott连续映射为态射的FS-局部dcpo范畴都是笛卡儿闭范畴. 相似文献
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定义了一类序结构-FS-交连续domain,讨论其相关性质并证明:(1)FS-交连续domain关于由Scott连续且保持非空有限交运算的函数构成的函数空间封闭,以(代数)FS-交连续domain为对象、以Scott连续函数为态射的范畴是Cartesian闭范畴;(2)任意分配可乘的有界完备domain是FS-交连续domain,从而紧连续dcpo的Smyth幂domain是FS-交连续domain.这些结果表明,FS-交连续domain是关于保非空有限交的连续映射构成的函数空间封闭的最恰当序结构. 相似文献
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定义了一类序结构—FS-交连续domain,讨论其相关性质并证明:(1)FS-交连续domain关于由Scott连续且保持非空有限交运算的函数构成的函数空间封闭,以(代数)FS-交连续domain为对象、以Scott连续函数为态射的范畴是Cartesian闭范畴;(2)任意分配可乘的有界完备domain是FS-交连续domain,从而紧连续dcpo的Smyth幂domain是FS-交连续domain.这些结果表明,FS-交连续domain是关于保非空有限交的连续映射构成的函数空间封闭的最恰当序结构. 相似文献
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稳定映射与局部代数格范畴的笛卡儿闭性 总被引:9,自引:1,他引:8
本文引入稳定映射迹的概念,得到了局部代数格上的稳定映射可由迹唯一确定以及局部代数格的稳定映射空间关于稳定关系构成局部代数格,在此基础上证明了以局部代数格为对象稳定映射为态射的范畴是笛卡儿闭范畴。 相似文献
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可数sober空间是sober空间的一种推广.本文讨论了可数sober空间的一些性质,特别地证明了以可数sober空间为对象、以连续映射为态射的范畴CSOB为完备范畴以及从任意空间到可数sober空间的连续映射空间为可数sober空间. 相似文献
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本文引进了新的闭包系统,新的闭包算子等概念,研究了它们之间的相互关系,给出了由闭包系统来表示有限原子格的表示定理,证明了分别以这些数学结构为对象,以它们之间的同态映射作为态射,所对应的格范畴和对应的闭包系统范畴是范畴等价的. 相似文献
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本文研究了在一般topos中内蕴Heyting代数对象的性质.利用范畴的态射及伴随的方法,获得了内蕴Heyting代数对象为内蕴分配格结果,推广了集合范畴中的对应结果. 相似文献
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In this paper, we investigate the best known and most important example of a categorical equivalence in algebra, that between the variety of boolean algebras and any variety generated by a single primal algebra. We consider this equivalence in the context of Kechris-Pestov-Todor?evi? correspondence, a surprising correspondence between model theory, combinatorics and topological dynamics. We show that relevant combinatorial properties (such as the amalgamation property, Ramsey property and ordering property) carry over from a category to an equivalent category. We then use these results to show that the category whose objects are isomorphic copies of finite powers of a primal algebra \({\mathcal{A}}\) together with a particular linear ordering <, and whose morphisms are embeddings, is a Ramsey age (and hence a Fraïssé age). By the Kechris-Pestov-Todor?evi? correspondence, we then infer that the automorphism group of its Fraïssé limit is extremely amenable. This correspondence also enables us to compute the universal minimal flow of the Fraïssé limit of the class \({{\bf V}_{fin} \mathcal{(A)}}\) whose objects are isomorphic copies of finite powers of a primal algebra \({\mathcal{A}}\) and whose morphisms are embeddings. 相似文献
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For any finite group G, we define a bivariant functor from the Dress category of finite G-sets to the conjugation biset category, whose objects are subgroups of G, and whose morphisms are generated by certain bifree bisets. Any additive functor from the conjugation biset category to
abelian groups yields a Mackey functor by composition. We characterize the Mackey functors which arise in this way. 相似文献
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S. Sh. Mousavi 《代数通讯》2020,48(8):3184-3203
AbstractIn category theory, the existence of free objects is very important, especially free modules that play an important role in homological algebra. Although algebraic hyperstructures are a natural extension of algebraic structures, due to the major difference between them, study-free objects in algebraic hyperstructures become very difficult. In this article, we provide a categorical approach for the construction of free hypermodules. In fact, by considering appropriate morphisms between hypermodules, we characterize free hypermodules from three different perspectives. 相似文献
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We establish a duality between two categories, extending the Stone duality between totally disconnected compact Hausdorff
spaces (Stone spaces) and Boolean rings with a unit. The first category denoted by RHQS, has as objects the representations
of Hansdorff quotients of Stone spaces and as morphisms all compatible continuous functions. The second category, denoted
by BRLR, has as objects all Boolean rings with a unit endowed with a link relation and as morphisms all compatible Boolean
rings with unit morphisms. Furthermore, we study connectedness from an algebraic point of view, in the context of the proposed
generalized Stone duality.
This revised version was published online in June 2006 with corrections to the Cover Date. 相似文献
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I. Albrecht 《Journal of Mathematical Sciences》2013,193(3):341-349
In this article, the first steps towards mathematical modelling of time-related musical structures are taken, and the algebraic structure of musical time relations is elaborated starting from a perceptive point of view. A basic characterization of fundamental properties of perceived time relations and their interpretations regarding musical context are given, and some mathematical properties of the proposed definitions are examined. Stemming from musical motivation, a category is found whose objects are finite strict (partially) ordered sets and whose morphisms are weakly monotone and reflect the strict order of the codomain. The category is found to have initial and terminal objects, equalizers, and coequalizers but fails to have binary products or coproducts. 相似文献
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Takahisa Miyata 《Topology and its Applications》2010,157(14):2194-2224
The notions of pro-fibration and approximate pro-fibration for morphisms in the pro-category pro-Top of topological spaces were introduced by S. Mardeši? and T.B. Rushing. In this paper we introduce the notion of strong pro-fibration, which is a pro-fibration with some additional property, and the notion of ANR object in pro-Top, which is approximately an ANR-system, and we consider the full subcategory ANR of pro-Top whose objects are ANR objects. We prove that the category ANR satisfies most of the axioms for fibration category in the sense of H.J. Baues if fibrations are strong pro-fibrations and weak equivalences are morphisms inducing isomorphisms in the pro-homotopy category pro-H(Top) of topological spaces. We give various applications. First of all, we prove that every shape morphism is represented by a strong pro-fibration. Secondly, the fibre of a strong pro-fibration is well defined in the category ANR, and we obtain an isomorphism between the pro-homotopy groups of the base and total systems of a strong pro-fibration, and hence obtain the pro-homotopy sequence of a strong pro-fibration. Finally, we also show that there is a homotopy decomposition in the category ANR. 相似文献
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The objects of the Dranishnikov asymptotic category are proper metric spaces and the morphisms are asymptotically Lipschitz maps. In this paper we provide an example of an asymptotically zero-dimensional space (in the sense of Gromov) whose space of compact convex subsets of probability measures is not an absolute extensor in the asymptotic category in the sense of Dranishnikov. 相似文献
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A categorical representation of algebraic domains based on variations of rough approximable concepts
《International Journal of Approximate Reasoning》2014,55(3):885-895
In this paper, we propose two variations of rough approximable concepts and investigate the order-theoretic properties of the associated concept hierarchies. We first show that every rough pseudo-concept hierarchy is a completely distributive lattice and its completely compact elements are exactly the rough pseudo-concepts generated from individual attributes. Next, we propose the notions of hyper-contexts and hyper-concepts, and prove that they provide an approach to restructuring algebraic domains. Finally, we set hyper-contexts into a category in which hyper-mappings serve as the morphisms. It turns out that this category is precisely equivalent to that of algebraic domains. 相似文献
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Closure systems (spaces) play an important role in characterizing certain ordered structures. In this paper, FinSet-bounded algebraic closure spaces are introduced, and then used to provide a new approach to constructing algebraic domains. Then, a special family of algebraic closure spaces, algebraic L-closure spaces, are used to represent algebraic L-domains. Next, algebraic approximate mappings are defined and serve as the appropriate morphisms between algebraic closure spaces, respectively, algebraic L-closure spaces. On the categorical level, we show that algebraic closure spaces (respectively, algebraic L-closure spaces,) each equipped with algebraic approximate mappings as morphisms, are equivalent to algebraic domains (respectively, algebraic L-domains) with Scott continuous functions as morphisms.
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