Definitions from Wikipedia (Existentially closed model)
▸ noun: In model theory, a branch of mathematical logic, the notion of an existentially closed model (or existentially complete model) of a theory generalizes the notions of algebraically closed fields (for the theory of fields), real closed fields (for the theory of ordered fields), existentially closed groups (for the theory of groups), and dense linear orders without endpoints (for the theory of linear orders).
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▸ noun: In model theory, a branch of mathematical logic, the notion of an existentially closed model (or existentially complete model) of a theory generalizes the notions of algebraically closed fields (for the theory of fields), real closed fields (for the theory of ordered fields), existentially closed groups (for the theory of groups), and dense linear orders without endpoints (for the theory of linear orders).
▸ Words similar to existentially closed model
▸ Usage examples for existentially closed model
▸ Idioms related to existentially closed model
▸ Wikipedia articles (New!)
▸ Words that often appear near existentially closed model
▸ Rhymes of existentially closed model
▸ Invented words related to existentially closed model