Axiom schema of predicative separation

The axiom asserts only the existence of a subset of a set if that subset can be defined without reference to the entire universe of sets. The formal statement of this is the same as full separation schema, but with a restriction on the formulas that may be used: For any formula φ,

${\displaystyle \forall x\;\exists y\;\forall z\;(z\in y\leftrightarrow z\in x\wedge \phi (z))}$

provided that φ contains only bounded quantifiers and, as usual, that the variable y is not free in it. So all quantifiers in φ, if any, must appear in the forms

${\displaystyle \exists u\in v\;\psi (u)}$

${\displaystyle \forall u\in v\;\psi (u)}$

for some sub-formula ψ and, of course, the definition of ${\displaystyle v}$ is bound to those rules as well.

The axiom appears in the systems of constructive set theory CST and CZF, as well as in the system of Kripke–Platek set theory.

• Constructive set theory
• Axiom schema of separation