About: Whitehead's point-free geometry

In mathematics, point-free geometry is a geometry whose primitive ontological notion is region rather than point. Two axiomatic systems are set out below, one grounded in mereology, the other in mereotopology and known as connection theory. A point can mark a space or objects.

Property	Value
dbpprop:abstract	In mathematics, point-free geometry is a geometry whose primitive ontological notion is region rather than point. Two axiomatic systems are set out below, one grounded in mereology, the other in mereotopology and known as connection theory. A point can mark a space or objects.
dbpprop:hasPhotoCollection	http://www4.wiwiss.fu-berlin.de/flickrwrappr/photos/Whitehead%27s_point-free_geometry
dbpprop:reference	http://www.dmi.unisa.it/people/gerla/www/Down/point-free.pdf http://www.gutenberg.org/files/18835/18835-h/18835-h.htm http://www.dmi.unisa.it/people/gerla/www/ http://www.math.ucla.edu/~asl/bsl/1404/1404-002.ps
rdfs:comment	In mathematics, point-free geometry is a geometry whose primitive ontological notion is region rather than point. Two axiomatic systems are set out below, one grounded in mereology, the other in mereotopology and known as connection theory. A point can mark a space or objects.
rdfs:label	Whitehead's point-free geometry
owl:sameAs	freebase:Whitehead's point-free geometry
skos:subject	dbpedia:Category:Mathematical_axioms dbpedia:Category:Ontology dbpedia:Category:Topology dbpedia:Category:History_of_mathematics dbpedia:Category:Mereology
foaf:page	http://en.wikipedia.org/wiki/Whitehead%27s_point-free_geometry
is dbpprop:redirect of	dbpedia:Point-free_geometry dbpedia:Whitehead_point-free_geometry