In model theory, a forking extension of a type is an extension of that type that is not free[ clarify] whereas a non-forking extension is an extension that is as free as possible. This can be used to extend the notions of linear or algebraic independence to stable theories. These concepts were introduced by S. Shelah.
Definitions
Suppose that A and B are models of some complete ω-stable theory T. If p is a type of A and q is a type of B containing p, then q is called a forking extension of p if its Morley rank is smaller, and a nonforking extension if it has the same Morley rank.
Axioms
Let T be a stable complete theory. The non-forking relation ≤ for types over T is the unique relation that satisfies the following axioms:
- If p≤ q then p⊂q. If f is an elementary map then p≤q if and only if fp≤fq
- If p⊂q⊂r then p≤r if and only if p≤q and q≤ r
- If p is a type of A and A⊂B then there is some type q of B with p≤q.
- There is a cardinal κ such that if p is a type of A then there is a subset A0 of A of cardinality less than κ so that (p|A0) ≤ p, where | stands for restriction.
- For any p there is a cardinal λ such that there are at most λ non-contradictory types q with p≤q.
References
- Harnik, Victor; Harrington, Leo (1984), "Fundamentals of forking", Ann. Pure Appl. Logic, 26 (3): 245–286, doi: 10.1016/0168-0072(84)90005-8, MR 0747686
- Lascar, Daniel; Poizat, Bruno (1979), "An Introduction to Forking", The Journal of Symbolic Logic, 44 (3), Association for Symbolic Logic: 330–350, doi: 10.2307/2273127, JSTOR 2273127
- Makkai, M. (1984), "A survey of basic stability theory, with particular emphasis on orthogonality and regular types", Israel Journal of Mathematics, 49 (1–3): 181–238, doi: 10.1007/BF02760649, S2CID 121533246
- Marker, David (2002), Model Theory: An Introduction, Graduate Texts in Mathematics, Berlin, New York: Springer-Verlag, ISBN 978-0-387-98760-6
- Ng, Siu-Ah (2001) [1994], "Forking", Encyclopedia of Mathematics, EMS Press
- Shelah, Saharon (1990) [1978], Classification theory and the number of nonisomorphic models, Studies in Logic and the Foundations of Mathematics (2nd ed.), Elsevier, ISBN 978-0-444-70260-9
In model theory, a forking extension of a type is an extension of that type that is not free[ clarify] whereas a non-forking extension is an extension that is as free as possible. This can be used to extend the notions of linear or algebraic independence to stable theories. These concepts were introduced by S. Shelah.
Definitions
Suppose that A and B are models of some complete ω-stable theory T. If p is a type of A and q is a type of B containing p, then q is called a forking extension of p if its Morley rank is smaller, and a nonforking extension if it has the same Morley rank.
Axioms
Let T be a stable complete theory. The non-forking relation ≤ for types over T is the unique relation that satisfies the following axioms:
- If p≤ q then p⊂q. If f is an elementary map then p≤q if and only if fp≤fq
- If p⊂q⊂r then p≤r if and only if p≤q and q≤ r
- If p is a type of A and A⊂B then there is some type q of B with p≤q.
- There is a cardinal κ such that if p is a type of A then there is a subset A0 of A of cardinality less than κ so that (p|A0) ≤ p, where | stands for restriction.
- For any p there is a cardinal λ such that there are at most λ non-contradictory types q with p≤q.
References
- Harnik, Victor; Harrington, Leo (1984), "Fundamentals of forking", Ann. Pure Appl. Logic, 26 (3): 245–286, doi: 10.1016/0168-0072(84)90005-8, MR 0747686
- Lascar, Daniel; Poizat, Bruno (1979), "An Introduction to Forking", The Journal of Symbolic Logic, 44 (3), Association for Symbolic Logic: 330–350, doi: 10.2307/2273127, JSTOR 2273127
- Makkai, M. (1984), "A survey of basic stability theory, with particular emphasis on orthogonality and regular types", Israel Journal of Mathematics, 49 (1–3): 181–238, doi: 10.1007/BF02760649, S2CID 121533246
- Marker, David (2002), Model Theory: An Introduction, Graduate Texts in Mathematics, Berlin, New York: Springer-Verlag, ISBN 978-0-387-98760-6
- Ng, Siu-Ah (2001) [1994], "Forking", Encyclopedia of Mathematics, EMS Press
- Shelah, Saharon (1990) [1978], Classification theory and the number of nonisomorphic models, Studies in Logic and the Foundations of Mathematics (2nd ed.), Elsevier, ISBN 978-0-444-70260-9