A Relational Localisation Theory for Topological Algebras
In this thesis, we develop a relational localisation theory for topological algebras, i.e., a theory that studies local approximations of a topological algebra’s relational counterpart. In order to provide an appropriate framework for our considerations, we first introduce a general Galois theory be...
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Format: | Doctoral Thesis |
Language: | English |
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Saechsische Landesbibliothek- Staats- und Universitaetsbibliothek Dresden
2012
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Online Access: | http://nbn-resolving.de/urn:nbn:de:bsz:14-qucosa-93424 http://nbn-resolving.de/urn:nbn:de:bsz:14-qucosa-93424 http://www.qucosa.de/fileadmin/data/qucosa/documents/9342/thesis.pdf |
Summary: | In this thesis, we develop a relational localisation theory for topological algebras, i.e., a theory that studies local approximations of a topological algebra’s relational counterpart. In order to provide an appropriate framework for our considerations, we first introduce a general Galois theory between continuous functions and closed relations on an arbitrary topological space. Subsequently to this rather foundational discussion, we establish the desired localisation theory comprising the identification of suitable subsets, the description of local structures, and the retrieval of global information from local data. Among other results, we show that the restriction process with respect to a sufficiently large collection of local approximations of a Hausdorff topological algebra extends to a categorical equivalence between the topological quasivariety generated by the examined structure and the one generated by its localisation. Furthermore, we present methods for exploring topological algebras possessing certain operational compactness properties. Finally, we explain the developed concepts and obtained results in the particular context of three important classes of topological algebras by analysing the local structure of essentially unary topological algebras, topological lattices, and topological modules of compact Hausdorff topological rings. |
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