Hostname: page-component-586b7cd67f-gb8f7 Total loading time: 0 Render date: 2024-11-26T23:55:04.076Z Has data issue: false hasContentIssue false

THE EXACT STRENGTH OF THE CLASS FORCING THEOREM

Part of: Set theory

Published online by Cambridge University Press:  29 July 2020

VICTORIA GITMAN
Affiliation:
THE CITY UNIVERSITY OF NEW YORK CUNY GRADUATE CENTER, MATHEMATICS PROGRAM 365 FIFTH AVENUE, NEW YORK, NY10016, USAE-mail: [email protected]: http://victoriagitman.github.io
JOEL DAVID HAMKINS
Affiliation:
FACULTY OF PHILOSOPHY UNIVERSITY OF OXFORDOXFORDOX1 2JD, UK SIR PETER STRAWSON FELLOW UNIVERSITY COLLEGE HIGH STREET OXFORDOX1 4BH, UKE-mail: [email protected]: http://jdh.hamkins.org
PETER HOLY
Affiliation:
UNIVERSITÀ DEGLI STUDI DI UDINE, DIPARTIMENTO DI SCIENZE MATEMATICHE INFORMATICHE E FISICHE (DMIF) VIA DELLE SCIENZE 206, UDINE33100, ITALYE-mail: [email protected]
PHILIPP SCHLICHT
Affiliation:
UNIVERSITY OF BRISTOL, SCHOOL OF MATHEMATICS FRY BUILDING, WOODLAND ROAD, BRISTOL, BS8 1UG, UKE-mail: [email protected]
KAMERYN J. WILLIAMS
Affiliation:
UNIVERSITY OF HAWAI‘I AT MĀNOA, DEPARTMENT OF MATHEMATICS 2565 MCCARTHY MALL, KELLER 401A, HONOLULU, HI96822, USAE-mail: [email protected]: http://kamerynjw.net

Abstract

The class forcing theorem, which asserts that every class forcing notion ${\mathbb {P}}$ admits a forcing relation $\Vdash _{\mathbb {P}}$ , that is, a relation satisfying the forcing relation recursion—it follows that statements true in the corresponding forcing extensions are forced and forced statements are true—is equivalent over Gödel–Bernays set theory $\text {GBC}$ to the principle of elementary transfinite recursion $\text {ETR}_{\text {Ord}}$ for class recursions of length $\text {Ord}$ . It is also equivalent to the existence of truth predicates for the infinitary languages $\mathcal {L}_{\text {Ord},\omega }(\in ,A)$ , allowing any class parameter A; to the existence of truth predicates for the language $\mathcal {L}_{\text {Ord},\text {Ord}}(\in ,A)$ ; to the existence of $\text {Ord}$ -iterated truth predicates for first-order set theory $\mathcal {L}_{\omega ,\omega }(\in ,A)$ ; to the assertion that every separative class partial order ${\mathbb {P}}$ has a set-complete class Boolean completion; to a class-join separation principle; and to the principle of determinacy for clopen class games of rank at most $\text {Ord}+1$ . Unlike set forcing, if every class forcing notion ${\mathbb {P}}$ has a forcing relation merely for atomic formulas, then every such ${\mathbb {P}}$ has a uniform forcing relation applicable simultaneously to all formulas. Our results situate the class forcing theorem in the rich hierarchy of theories between $\text {GBC}$ and Kelley–Morse set theory $\text {KM}$ .

Type
Articles
Copyright
© The Association for Symbolic Logic 2020

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

REFERENCES

Fujimoto, K., Classes and truths in set theory . Annals of Pure and Applied Logic , vol. 163 (2012), no. 11, pp. 14841523.CrossRefGoogle Scholar
Gitman, V. and Hamkins, J. D., Open determinacy for class games , Foundations of Mathematics (Caicedo, A. E., Cummings, J., Koellner, P., and Larson, P., editors), Contemporary Mathematics, vol. 690, American Mathematical Society, Providence, RI (2017) Newton Institute, 2016, pp. 121143.CrossRefGoogle Scholar
Hamkins, J. D. and Leahy, C., Algebraicity and implicit definability in set theory . Notre Dame Journal of Formal Logic , vol. 57 (2016), no. 3, pp. 431439.CrossRefGoogle Scholar
Hamkins, J. D. and Seabold, D., Well-founded Boolean ultrapowers as large cardinal embeddings, preprint, 2006, arXiv:1206.6075.Google Scholar
Hamkins, J. D. and Yang, R., Satisfaction is not absolute. The Review of Symbolic Logic , to appear. Preprint, arXiv:1312.0670 (2013).Google Scholar
Holy, P., Krapf, R., Lücke, P., Njegomir, A., and Schlicht, P., Class forcing, the forcing theorem and Boolean completions, this Journal, vol. 81 (2016), no. 4, pp. 15001530.Google Scholar
Holy, P., Krapf, R., and Schlicht, P., Characterizations of pretameness and the Ord-cc . Annals of Pure and Applied Logic , vol. 169 (2018), no. 8, pp. 775802.CrossRefGoogle Scholar
Krajewski, S., Mutually inconsistent satisfaction classes . Bulletin of the Polish Academy of Sciences Mathematics Astronomy and Physics , vol. 22 (1974), pp. 983987.Google Scholar
Krapf, R., Class forcing and second-order arithmetic , Ph.D. thesis, University of Bonn, 2017.Google Scholar
Sato, S., Relative predicativity and dependent recursion in second-order set theory and higher-order theories, this Journal, vol. 79 (2014), no. 3, pp. 712732.Google Scholar
Williams, K. J., Minimum models of second-order set theories, this Journal, vol. 8 (2019), no. 2, pp. 589620.Google Scholar