A theory T is inductive if any union of an increasing chain of models of T (possibly of transfinite length) is a model of T as well.

An ∀∃-sentence is a sentence of the form

$\forall x\exists y:\phi (x;y)$

with x and y tuples and $\phi (x;y)$ quantifier-free. An ∀∃-theory is a theory made of ∀∃-sentences.

It turns out that these two notions are essentially the same:

Theorem: Let T be a theory. The following are equivalent:

(a) If $\{M_{\alpha }:\alpha <\lambda \}$ is an increasing chain of models of T (so $M_{\alpha }\subset M_{\beta }$ for $\alpha <\beta$ ), then the union $\bigcup _{\alpha <\lambda }M_{\alpha }$ is a model of T.

(b) If $M_{1}\subset M_{2}\subset \cdots$ is an increasing chain of models of T, of length $\omega$ , then $\bigcup _{i=1}^{\infty }M_{i}$ is a model of T.

Proof[]

Proof: Clearly (a) implies (b), since (b) is the $\lambda =\omega$ case of (a). The implication from (c) to (a) is also relatively straightforward. It boils down to the fact that if $\{M_{\alpha }:\alpha <\lambda \}$ is an increasing chain of structures, and

$M_{\alpha }\models \forall x\exists y:\phi (x;y)\qquad (*)$

for all $\alpha$ , then

$\bigcup _{\alpha <\lambda }M_{\alpha }\models \forall x\exists y:\phi (x;y)$

Indeed, if x = a is a tuple from the union, then a is finite, so a comes from some specific $M_{\alpha }$ . By (*), there is some b in $M_{\alpha }$ such that $M_{\alpha }\models \phi (a;b)$ . As $\phi (x;y)$ is quantifier-free, $\phi (a;b)$ also holds in the union. So for any a from the union, there is some b from the union such that $\phi (a;b)$ holds, as claimed.

It remains to show that (b) implies (c). Let T_∀∃ denote the set of all ∀∃-sentences implied by T. Any model of T is a model of T_∀∃. If we show the converse, then T is equivalent to the ∀∃-theory T_∀∃, and we are done.

Claim: Let M be a model of T_∀∃. Then there is a model M₂ of T extending M, and a structure M₃ extending M₂ such that M₃ is an elementary extension of M.

Proof: Elementary extensions of M are the same thing as models of the elementary diagram of M. Let S be the elementary diagram of M. Consider S_∀, the set of universal sentences over M which hold in M. If S_∀ ∪ T is inconsistent, then there is some true universal statement about some element of M which contradicts T. That is, there is a universal formula $\phi (x)$ , and a tuple a from M, such that

$M\models \phi (a)$

and

$T\cup \{\phi (a)\}$ is inconsistent.

By the lemma on constants,

$T\vdash \forall x\neg \phi (x)$

Now the formula $\neg \phi (x)$ is existential, so the sentence $\forall x\neg \phi (x)$ is an ∀∃-sentence. In particular, it is part of T_∀∃, so it holds in M:

$M\models \forall x\neg \phi (x)$

But this contradicts the fact that $M\models \phi (a)$ .

Therefore S_∀ ∪ T actually is consistent. Let M₂ be a model. Then M₂ is a model of T. Also, S_∀ contains all the quantifier-free statements in S, which exactly constitute the diagram of M. So M₂ is a model of the diagram of M, i.e., M₂ is an extension of M.

Finally, since M₂ satisfies the universal theory of the elementary diagram of M, we can embed M₂ into some model M₃ of the elementary diagram of M. But a model of the the elementary diagram of M is just an elementary extension of M. So we have produced the desired extensions. QED_claim

Now, given a model M of T_∀∃, we will prove that M is a model of T, completing the proof of the Theorem.

By the Claim, we can produce

$M=M_{1}\subset M_{2}\subset M_{3}$

with $M_{1}\preceq M_{3}$ and $M_{2}\models T$ . Since $M_{1}\equiv M_{3}$ , $M_{3}$ is itself a model of $T_{\forall \exists }$ . So we can apply the claim to $M_{3}$ , producing

$M=M_{1}\subset M_{2}\subset M_{3}\subset M_{4}\subset M_{5}$

with $M_{3}\preceq M_{5}$ and $M_{4}\models T$ .

Continuing on in this fashion, one gets an infinite ascending chain of structures

$M=M_{1}\subset M_{2}\subset \cdots$

such that $M_{2k}\models T$ and

$M_{1}\preceq M_{3}\preceq M_{5}\preceq \cdots$ .

By the Tarski-Vaught Theorem,

$M=M_{1}\preceq \bigcup _{i=1}^{\infty }M_{2i-1}=\bigcup _{i=1}^{\infty }M_{i}$ .

And, since

$M_{2}\subset M_{4}\subset M_{6}\subset \cdots$

is an increasing chain of models of T, of length $\omega$ , we have

$\bigcup _{i=1}^{\infty }M_{i}=\bigcup _{i=1}^{\infty }M_{2i}\models T$ .

So M is an elementary substructure of a model of T. Therefore, M is a model of T.

So every model of T_∀∃ is a model of T. Consequently, T is equivalent to the ∀∃-theory T_∀∃. This shows that (b) implies (c), completing the proof of the theorem. QED.

Examples[]

Many common theories have this property:

Rings, groups, boolean algebras, anything equational
Fields, differential fields, difference fields, integral domains
Any model complete theory: an ascending chain of models will always be an elementary chain of models (by model completeness), so the union will still be a model.
Any universal theory, such as T_∀ for any theory T.
DLO
The random graph
PAC fields

A simple example of a theory without this property is the theory of $\mathbb {Z}$ as an ordered set. Note that

$\mathbb {Z} \subset {\frac {1}{2}}\mathbb {Z} \subset {\frac {1}{4}}\mathbb {Z} \subset \cdots$

is an ascending chain of models of this theory. (Each structure in this chain is isomorphic to $\mathbb {Z}$ , so certainly a model of its complete theory.) However, the union of this increasing chain is the ring $\mathbb {Z} [1/2]$ , which is a dense linear order. In particular, the statement

$\forall x\forall y:x<y\rightarrow \exists z:x<z<y$

holds in the limit, even though it is false in $\mathbb {Z}$ . So the limit is not a model of this theory.

For a more real-world example, the theory of pseudo-finite fields is not inductive. For example, let $\mathbb {F} _{q}$ be the field with q elements. For each n > 0, let K_n be the amalgam of $\mathbb {F} _{2^{p^{k}}}$ as p ranges over all primes. It is known that K_n is pseudo-finite for each n. Also, K_n ⊆ K_n+1 for each n, so we have an ascending chain of pseudo-finite fields. However,

$\bigcup _{n=1}^{\infty }K_{n}={\overline {\mathbb {F} _{q}}}$

is algebraically closed, rather than pseudo-finite.

(On the other hand, the theory of pseudo-finite fields can be made to be model complete by adding in predicates SOL_n(x₁,...,x_n) interpreted as

$\exists y:y^{n}=x_{1}y^{n-1}+\cdots +x_{n-1}y+x_{n}$ )

Inductive Theories and Existential Closedness[]

Inductive theories cooperate well with notions such as existential closedness and model companions. The main results are:

Theorem: Let T be inductive. Then every model of T can be embedded into an existentially closed model of T.

Theorem: Let T be inductive. Then T has a model companion if and only if the class of existentially closed models of T is an elementary class. If so, the models of the model companion of T are exactly the existentially closed models of T. ::: ::: :::