About: Uniform tree

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In mathematics, a uniform tree is a locally finite tree which is the universal cover of a finite graph. Equivalently, the full automorphism group G=Aut(X) of the tree, which is a locally compact topological group, is unimodular and G\X is finite. Also equivalent is the existence of a uniform X-lattice in G.

Property	Value
dbo:abstract	In mathematics, a uniform tree is a locally finite tree which is the universal cover of a finite graph. Equivalently, the full automorphism group G=Aut(X) of the tree, which is a locally compact topological group, is unimodular and G\X is finite. Also equivalent is the existence of a uniform X-lattice in G. (en)
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dbo:wikiPageWikiLink	dbr:Locally_compact_topological_group dbc:Trees_(graph_theory) dbr:Tree_(graph_theory) dbr:Alexander_Lubotzky dbr:Automorphism_group dbr:Unimodular_group dbr:Universal_cover dbr:Tree_lattice dbr:Finite_graph
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dcterms:subject	dbc:Trees_(graph_theory)
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rdfs:comment	In mathematics, a uniform tree is a locally finite tree which is the universal cover of a finite graph. Equivalently, the full automorphism group G=Aut(X) of the tree, which is a locally compact topological group, is unimodular and G\X is finite. Also equivalent is the existence of a uniform X-lattice in G. (en)
rdfs:label	Uniform tree (en)
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