Topological functors and right adjoints

General Topology and its Applications Pub Date : 1978-07-01 DOI:10.1016/0016-660X(78)90054-5

Harvey Wolff

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引用次数: 5

Abstract

Let T: $A$ → $L$ be an ( $L$ , $M$ )-topological functor and S: $B$ → $Y$ a faithful functor. Let F: $L$ → $Y$ and L: $A$ → $B$ be functors with a:FT → SL an epi natural transformation. We are concerned with the question of when L has a right adjoint given that F has a right adjoint. We give two characterizations of the existence of a right adjoint to L. One involves just the “topological data” and the other is an application of Freyd's adjoint functor theorem. As a consequence, we characterize when a category which is monoidal and ( $L$ , $M$ )-topological over a monoidal closed category is also closed.

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拓扑函子和右伴随

设T:A→L是一个(L, M)拓扑函子，S:B→Y是一个忠实函子。设F:L→Y和L:A→B是具有A:FT→SL和外延自然变换的函子。我们关心的问题是当L有右伴随时假设F有右伴随。我们给出了l的右伴随存在的两个刻画，一个只涉及“拓扑数据”，另一个是fred伴随函子定理的一个应用。因此，我们刻画了当一个一元闭范畴上的(L, M)-拓扑范畴也是闭范畴时的性质。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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