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Forcing and reducibilities. III. Forcing in fragments of set theory

Published online by Cambridge University Press:  12 March 2014

Piergiorgio Odifreddi
Piergiorgio Odifreddi*
Affiliation:
University of Turin, Turin, Italy
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Extract

We conclude here the treatment of forcing in recursion theory begun in Part I and continued in Part II of [31]. The numbering of sections is the continuation of the numbering of the first two parts. The bibliography is independent.

In Part I our language was a first-order language: the only set we considered was the (set constant for the) generic set. In Part II a second-order language was introduced, and we had to interpret the second-order variables in some way. What we did was to consider the ramified analytic hierarchy, defined by induction as:

A0 = {Xω: X is arithmetic},

Aα+1 = {Xω: X is definable (in 2nd order arithmetic) over Aα},

Aλ = ⋃α<λAα (λ limit),

RA = ⋃αAα.

We then used (a relativized version of) the fact that (Kleene [27]). The definition of RA is obviously modeled on the definition of the constructible hierarchy introduced by Gödel [14]. For this we no longer work in a language for second-order arithmetic, but in a language for (first-order) set theory with membership as the only nonlogical relation:

L0 = ⊘,

Lα+1 = {X: X is (first-order) definable over Lα},

Lλ = ⋃α<λLα (λ limit),

L = ⋃αLα.

Type
Research Article
Information
The Journal of Symbolic Logic , Volume 48 , Issue 4 , December 1983 , pp. 1013 - 1034
Copyright
Copyright © Association for Symbolic Logic 1983

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