Paradoxical set
In set theory, a nice name is a concept used in forcing to impose an upper bound on the number of subsets in the generic model. It is a technical concept used in the context of forcing to prove independence results in set theory such as Easton's theorem.
Formal definition
Let ZFC be transitive, a forcing notion in , and suppose is generic over . Then for any -name in , ,
is a nice name for a subset of if is a -name satisfying the following properties:
(2) For all -names , forms an antichain.
(3) (Natural addition): If , then there exists in such that .
References
- Kenneth Kunen (1980) Set theory: an introduction to independence proofs, Volume 102 of Studies in logic and the foundations of mathematics (Elsevier) ISBN 0-444-85401-0, p.208