Denoted ( \emptyset ). For any sets a, b, there exists a set whose members are exactly a and b. [ \forall a \forall b \exists x \forall y (y \in x \leftrightarrow y = a \lor y = b) ]
Proof : Let ( A ) and ( B ) be sets. By Pairing, ( A, B ) is a set. By Union, ( \bigcup A, B ) is a set. But ( \bigcup A, B = A \cup B ). QED. suppes axiomatic set theory pdf
Denoted ( \bigcup A ). For any set A, there exists a set whose members are exactly all subsets of A. [ \forall A \exists P \forall x [x \in P \leftrightarrow x \subseteq A] ] Denoted ( \emptyset )
This avoids Russell’s paradox by restricting comprehension to subsets of existing sets. If a formula ( \phi(x, y) ) defines a functional relation on a set A, then the image of A under that function is a set. This is necessary for constructing ordinals like ( \omega + \omega ) and for proving the existence of ( \aleph_\omega ). Axiom 9: Axiom of Regularity (Foundation) Every non-empty set A has a member disjoint from A. [ \forall A [ A \neq \emptyset \rightarrow \exists x (x \in A \land x \cap A = \emptyset) ] ] By Pairing, ( A, B ) is a set
: The union of two sets is a set.
Introduction Patrick Suppes (1922–2014) was a towering figure in 20th-century philosophy of science, logic, and mathematics. His 1960 book, Axiomatic Set Theory , remains one of the most accessible yet rigorous introductions to the subject. Unlike more formalist treatments (e.g., Bernays–Gödel or Morse–Kelley), Suppes strikes a balance between philosophical motivation and technical precision. For decades, his text has been widely circulated as a PDF, serving self-learners, graduate students, and philosophers.
Suppes’ system is (ZF), plus Choice as an optional axiom. This matches most standard mathematics except for pathological choice-dependent results. 8. Sample Theorem and Proof Style Let’s illustrate Suppes’ rigor with a simple theorem from his book: