The semicontinuous quasi-uniformity of a frame

The aim of this note is to show how various facts in classical topology connected with semicontinuous functions and the semicontinuous quasi-uniformity have their counterparts in pointfree topology. In particular, we introduce the localic semicontinuous quasi-uniformity, which generalizes the semico...

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Detalhes bibliográficos
Autor principal:	Ferreira, Maria João (author)
Outros Autores:	Picado, Jorge (author)
Formato:	other
Idioma:	eng
Publicado em:	2003
Assuntos:	Frames Biframes Weil entourages Quasi-uniform frames Transitive quasi-uniformities Totally bounded quasi-uniformities Functorial quasi-uniformities Fletcher construction Spectrum covers Biframe of reals Semicontinuous real functions
Texto completo:	http://hdl.handle.net/10316/11427
País:	Portugal
Oai:	oai:estudogeral.sib.uc.pt:10316/11427

Descrição
Resumo:	The aim of this note is to show how various facts in classical topology connected with semicontinuous functions and the semicontinuous quasi-uniformity have their counterparts in pointfree topology. In particular, we introduce the localic semicontinuous quasi-uniformity, which generalizes the semicontinuous quasiuniformity of a topological space (known to be one of the most important examples of transitive compatible quasi-uniformities). We show that it can be characterized in terms of the so called spectrum covers, via a construction introduced by the authors in a previous paper. Several consequences are derived.

The semicontinuous quasi-uniformity of a frame

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