Definitions from Wiktionary (completeness axiom)
▸ noun: (mathematics) The following axiom (applied to an ordered field): for any subset of the given ordered field, if there is any upper bound for this subset, then there is also a supremum for this subset, and this supremum is an element of the given ordered field (though not necessarily of the subset).
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▸ noun: (mathematics) The following axiom (applied to an ordered field): for any subset of the given ordered field, if there is any upper bound for this subset, then there is also a supremum for this subset, and this supremum is an element of the given ordered field (though not necessarily of the subset).
Similar:
axiom of infinity,
absolute complement,
axiom of extensionality,
ideal,
supremum,
axiom of choice,
axiom of power set,
complete lattice,
axiom of union,
axiom of countable choice,
more...
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▸ Words similar to completeness axiom
▸ Usage examples for completeness axiom
▸ Idioms related to completeness axiom
▸ Wikipedia articles (New!)
▸ Words that often appear near completeness axiom
▸ Rhymes of completeness axiom
▸ Invented words related to completeness axiom