Łoś–Tarski preservation theorem
The Łoś–Tarski theorem is a theorem in model theory, a branch of mathematics, that states that the set of formulas preserved under taking substructures is exactly the set of universal formulas.[1] The theorem was discovered by Jerzy Łoś and Alfred Tarski.
Statement
[edit]Let be a theory in a first-order logic language and a set of formulas of . (The sequence of variables need not be finite.) Then the following are equivalent:
- If and are models of , , is a sequence of elements of . If , then .
( is preserved in substructures for models of ) - is equivalent modulo to a set of formulas of .
A formula is if and only if it is of the form where is quantifier-free.
In more common terms, this states that every first-order formula is preserved under induced substructures if and only if it is , i.e. logically equivalent to a first-order universal formula. As substructures and embeddings are dual notions, this theorem is sometimes stated in its dual form: every first-order formula is preserved under embeddings on all structures if and only if it is , i.e. logically equivalent to a first-order existential formula. [2]
Note that this property fails for finite models.
Citations
[edit]- ^ Hodges, Wilfrid (1997), A Shorter Model Theory, Cambridge University Press, p. 143, ISBN 0521587131
- ^ Rossman, Benjamin. "Homomorphism Preservation Theorems". J. ACM. 55 (3). doi:10.1145/1379759.1379763.
References
[edit]- Hinman, Peter G. (2005). Fundamentals of Mathematical Logic. A K Peters. p. 255. ISBN 1568812620.