Presents a novel approach to set theory that is entirely operational. This approach avoids the existential axioms associated with traditional Zermelo-Fraenkel set theory, and provides both a foundation for set theory and a practical approach to learning the subject.
1. Air Dispersion Modeling 2. Health Risk Assessment 3. Operations and Predicates 4. Replacement 5. Set Induction 6. Applications 7. Set Recursion 8. Ordinals 9. Omega 10. Power-Set and Cardinals 11. Formalization: Classical Logic 12. Formalization: Intuitionistic Logic