REAL

Epireflective subcategories of TOP, T 2 UNIF, UNIF, closed under epimorphic images, or being algebraic

Makai, Endre (2016) Epireflective subcategories of TOP, T 2 UNIF, UNIF, closed under epimorphic images, or being algebraic. PERIODICA MATHEMATICA HUNGARICA, 72 (2). pp. 112-129. ISSN 0031-5303

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Abstract

The epireflective subcategories of Top, that are closed under epimorphic (or bimorphic) images, are { X∣ | X| ≤ 1 } , { X∣ X is indiscrete} and Top. The epireflective subcategories of T2Unif, closed under epimorphic images, are: { X∣ | X| ≤ 1 } , { X∣ X is compact T2} , { X∣ covering character of X is ≤ λ0} (where λ0 is an infinite cardinal), and T2Unif. The epireflective subcategories of Unif, closed under epimorphic (or bimorphic) images, are: { X∣ | X| ≤ 1 } , { X∣ X is indiscrete} , { X∣ covering character of X is ≤ λ0} (where λ0 is an infinite cardinal), and Unif. The epireflective subcategories of Top, that are algebraic categories, are { X∣ | X| ≤ 1 } , and { X∣ X is indiscrete}. The subcategories of Unif, closed under products and closed subspaces and being varietal, are { X∣ | X| ≤ 1 } , { X∣ X is indiscrete} , { X∣ X is compact T2}. The subcategories of Unif, closed under products and closed subspaces and being algebraic, are { X∣ X is indiscrete} , and all epireflective subcategories of { X∣ X is compact T2}. Also we give a sharpened form of a theorem of Kannan-Soundararajan about classes of T3 spaces, closed for products, closed subspaces and surjective images. © 2016, Akadémiai Kiadó, Budapest, Hungary.

Item Type: Article
Uncontrolled Keywords: Varietal subcategories; Epireflective subcategories; Closedness under products and (closed) subspaces; Closedness under epimorphic or bimorphic images; Categories of (T2) topological, proximity and uniform spaces; Birkhoff type theorems; Algebraic subcategories
Subjects: Q Science / természettudomány > QA Mathematics / matematika
SWORD Depositor: MTMT SWORD
Depositing User: MTMT SWORD
Date Deposited: 02 Jan 2017 15:36
Last Modified: 02 Jan 2017 15:36
URI: http://real.mtak.hu/id/eprint/44152

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