@prefix psr: <http://data.loterre.fr/ark:/67375/PSR> .
@prefix skos: <http://www.w3.org/2004/02/skos/core#> .
@prefix dc: <http://purl.org/dc/terms/> .
@prefix xsd: <http://www.w3.org/2001/XMLSchema#> .

psr: a skos:ConceptScheme .
psr:-N67314KQ-Z
  skos:prefLabel "dimension inductive"@fr, "inductive dimension"@en ;
  dc:created "2023-09-01"^^xsd:date ;
  skos:broader psr:-DD6X8M67-X ;
  skos:related psr:-MGJVTWX1-0 ;
  skos:inScheme psr: ;
  skos:exactMatch <https://en.wikipedia.org/wiki/Inductive_dimension> ;
  a skos:Concept ;
  skos:definition """In the mathematical field of topology, the inductive dimension of a topological space <i>X</i> is either of two values, the small inductive dimension ind(<i>X</i>) or the large inductive dimension Ind(<i>X</i>). These are based on the observation that, in <i>n</i>-dimensional Euclidean space <i>R</i><sup><i>n</i> </sup>, (<i>n</i> − 1)-dimensional spheres (that is, the boundaries of <i>n</i>-dimensional balls) have dimension <i>n</i> − 1. Therefore it should be possible to define the dimension of a space inductively in terms of the dimensions of the boundaries of suitable open sets. 
<br/> (Wikipedia, The Free Encyclopedia, <a href="https://en.wikipedia.org/wiki/Inductive_dimension)">https://en.wikipedia.org/wiki/Inductive_dimension)</a>)"""@en ;
  dc:modified "2024-10-18"^^xsd:date .

psr:-MGJVTWX1-0
  skos:prefLabel "espace topologique"@fr, "topological space"@en ;
  a skos:Concept ;
  skos:related psr:-N67314KQ-Z .

psr:-DD6X8M67-X
  skos:prefLabel "théorie de la dimension"@fr, "dimension theory"@en ;
  a skos:Concept ;
  skos:narrower psr:-N67314KQ-Z .