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• Class models
• Relativization
• Absoluteness

• Kunen 1980: Chapter IV §2, §3 and §5. (p 112 ff)
• Jech: Chapter 12, pp. 161-164 (same content, more concise)
• Kunen 2011: I.16 (p 95 - 102) (same content, new edition)

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• Mostowski Collapse
• Reflection Principles

• Jech p. 68 - 69 (Mostowski collapse)
• Jech p. 168 - 170 (reflection)
• Kunen 1980: Chapter IV §7 (more detailed explanation of Reflection)
• Kunen 2011: II.5 (p. 129 ff) (another detailed explanation of Reflection)

• The main ideas will be presented in an introductory lecture; you can read the corresponding section for further details, but it is not obligatory and there are no assignments on this section.

• Kunen 2011: II.6, pp. 134 - 141.

• Definition of the axiom
• Basic properties

Remark: the axiom may seem arbitrary, but it is introduced here as a way of getting used to the combinatorics of forcing

• Kunen 2011: Section III.3 until incl. Lemma III.3.15, pp. 171-175.
• Kunen 2011: Lemma III.2.6, pp. 166 - 167 (Delta-Systems Lemma)

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• The general idea
• Generic extensions
• Properties of M[G]
• The semantic forcing relation ⊩

• Kunen 2011: Chapter IV, pp. 244 - 252 (except Lemma IV.2.15)
• Paul Cohen: The Discover of Forcing Extra material, for fun.

• The syntactic forcing relation ⊩^*
• The Truth Lemma and Definability Lemma
• Equivalence of the two forcing relations

• Kunen 2011: Chapter IV, pp. 255 - 262
• A talk by Paul Cohen, Vienna, 2006 Extra material, for fun (put your volume up, hard to hear)

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• M[G] ⊨ ZFC

• Kunen 2011: Lemma IV.2.15, Lemma IV.2.26 and Theorem IV.2.27

• Adding κ-many new reals by Cohen forcing
• Preservation of cardinals
• ccc forcings preserve cardinals
• Con(ZFC + ¬CH)

• Kunen 2011: pp. 263 - 265

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