Tarski and Szmielew showed that Robinson arithmetic (
) can be interpreted in a weak set theory whose axioms are extensionality, the existence of the empty set, and the axiom of adjunction (Tarski 1953, p.34).
In fact, empty set and adjunction alone (without extensionality) suffice to interpret
Adding epsilon-induction to empty set and adjunction yields a theory that is mutually interpretable with Peano arithmetic (
Another axiom schema also yields a theory that is mutually interpretable with
trivially true it reduced to the adjunction axiom above, and for