In the study of formal theories in mathematical logic, bounded quantifiers (a.k.a. restricted quantifiers) are often included in a formal language in addition to the standard quantifiers "∀" and "∃". Bounded quantifiers differ from "∀" and "∃" in that bounded quantifiers restrict the range of the quantified variable. The study of bounded quantifiers is motivated by the fact that determining whether a sentence with only bounded quantifiers is true is often not as difficult as determining whether an arbitrary sentence is true.
Examples of bounded quantifiers in the context of real analysis include:
\forallx>0
\existsy<0
\forallx\isinR
\forallx>0 \existsy<0 (x=y2)
Suppose that L is the language of Peano arithmetic (the language of second-order arithmetic or arithmetic in all finite types would work as well). There are two types of bounded quantifiers:
\foralln<t
\existsn<t
These quantifiers are defined by the following rules (
\phi
\existsn<t\phi\Leftrightarrow\existsn(n<t\land\phi)
\foralln<t\phi\Leftrightarrow\foralln(n<t → \phi)
There are several motivations for these quantifiers.
\phi
\existsn<t\phi
\foralln<t\phi
\langle0,1,+, x ,<,=\rangle
In general, a relation on natural numbers is definable by a bounded formula if and only if it is computable in the linear-time hierarchy, which is defined similarly to the polynomial hierarchy, but with linear time bounds instead of polynomial. Consequently, all predicates definable by a bounded formula are Kalmár elementary, context-sensitive, and primitive recursive.
In the arithmetical hierarchy, an arithmetical formula that contains only bounded quantifiers is called
| 0 | |
| \Sigma | |
| 0 |
| 0 | |
| \Delta | |
| 0 |
| 0 | |
| \Pi | |
| 0 |
Suppose that L is the language
\langle\in,\ldots,=\rangle
\forallx\int
\existsx\int
The semantics of these quantifiers is determined by the following rules:
\existsx\int (\phi)\Leftrightarrow\existsx(x\int\land\phi)
\forallx\int (\phi)\Leftrightarrow\forallx(x\int → \phi)
A ZF formula that contains only bounded quantifiers is called
\Sigma0
\Delta0
\Pi0
Bounded quantifiers are important in Kripke–Platek set theory and constructive set theory, where only Δ0 separation is included. That is, it includes separation for formulas with only bounded quantifiers, but not separation for other formulas. In KP the motivation is the fact that whether a set x satisfies a bounded quantifier formula only depends on the collection of sets that are close in rank to x (as the powerset operation can only be applied finitely many times to form a term). In constructive set theory, it is motivated on predicative grounds.
. Kunen, K. . Kenneth Kunen. Set theory: An introduction to independence proofs . registration . Elsevier . 1980 . 0-444-86839-9.