Definitions from Wiktionary (complete)
▸ verb: (ambitransitive) To finish; to make done; to reach the end.
▸ verb: (transitive) To make whole or entire.
▸ verb: (poker) To call from the small blind in an unraised pot.
▸ adjective: With all parts included; with nothing missing; full.
▸ adjective: Finished; ended; concluded; completed.
▸ adjective: Generic intensifier.
▸ adjective: (mathematical analysis, of a metric space or topological group) In which every Cauchy sequence converges to a point within the space.
▸ adjective: (ring theory, of a local ring) Complete as a topological group with respect to its m-adic topology, where m is its unique maximal idea.
▸ adjective: (algebra, of a lattice) In which every set with a lower bound has a greatest lower bound.
▸ adjective: (mathematics, of a category) In which all small limits exist.
▸ adjective: (logic, of a proof system of a formal system with respect to a given semantics) In which every semantically valid well-formed formula is provable.
▸ adjective: (computing theory, of a problem) That is in a given complexity class and is such that every other problem in the class can be reduced to it (usually in polynomial time or logarithmic space).
▸ noun: A completed survey.
▸ Also see complete
▸ Words similar to completest
▸ Usage examples for completest
▸ Idioms related to completest
▸ Wikipedia articles (New!)
▸ Popular adjectives describing completest
▸ Popular nouns described by completest
▸ Words that often appear near completest
▸ Rhymes of completest
▸ Invented words related to completest
▸ verb: (ambitransitive) To finish; to make done; to reach the end.
▸ verb: (transitive) To make whole or entire.
▸ verb: (poker) To call from the small blind in an unraised pot.
▸ adjective: With all parts included; with nothing missing; full.
▸ adjective: Finished; ended; concluded; completed.
▸ adjective: Generic intensifier.
▸ adjective: (mathematical analysis, of a metric space or topological group) In which every Cauchy sequence converges to a point within the space.
▸ adjective: (ring theory, of a local ring) Complete as a topological group with respect to its m-adic topology, where m is its unique maximal idea.
▸ adjective: (algebra, of a lattice) In which every set with a lower bound has a greatest lower bound.
▸ adjective: (mathematics, of a category) In which all small limits exist.
▸ adjective: (logic, of a proof system of a formal system with respect to a given semantics) In which every semantically valid well-formed formula is provable.
▸ adjective: (computing theory, of a problem) That is in a given complexity class and is such that every other problem in the class can be reduced to it (usually in polynomial time or logarithmic space).
▸ noun: A completed survey.
▸ Also see complete
Opposite:
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▸ Words similar to completest
▸ Usage examples for completest
▸ Idioms related to completest
▸ Wikipedia articles (New!)
▸ Popular adjectives describing completest
▸ Popular nouns described by completest
▸ Words that often appear near completest
▸ Rhymes of completest
▸ Invented words related to completest