Title of article
Rings of real functions in pointfree topology
Author/Authors
Gutiérrez Garcيa، نويسنده , , Javier Martinez-Picado، نويسنده , , Jorge، نويسنده ,
Issue Information
دوماهنامه با شماره پیاپی سال 2011
Pages
15
From page
2264
To page
2278
Abstract
This paper deals with the algebra F ( L ) of real functions on a frame L and its subclasses LSC ( L ) and USC ( L ) of, respectively, lower and upper semicontinuous real functions. It is well known that F ( L ) is a lattice-ordered ring; this paper presents explicit formulas for its algebraic operations which allow to conclude about their behaviour in LSC ( L ) and USC ( L ) .
lications, idempotent functions are characterized and previous pointfree results about strict insertion of functions are significantly improved: general pointfree formulations that correspond exactly to the classical strict insertion results of Dowker and Michael regarding, respectively, normal countably paracompact spaces and perfectly normal spaces are derived.
per ends with a brief discussion concerning the frames in which every arbitrary real function on the α-dissolution of the frame is continuous.
Keywords
Ring of continuous functions in pointfree topology , Sublocale , Strict insertion , Locale , Frame of reals , Scale , Lattice-ordered ring , Lower semicontinuous , Frame real function , Continuous real function , Upper semicontinuous , frame
Journal title
Topology and its Applications
Serial Year
2011
Journal title
Topology and its Applications
Record number
1583081
Link To Document