ramified forcing

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English[edit]

English Wikipedia has an article on:

ramified forcing

Noun[edit]

ramified forcing (uncountable)

(set theory) The original form of forcing, starting with a model $M$ of set theory in which the axiom of constructibility, $V = L$ , holds, and then building up a larger model $M [G]$ of Zermelo-Fraenkel set theory by adding a generic subset $G$ of a partially ordered set to $M$ , imitating Kurt Gödel's constructible hierarchy.

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