Pages that link to "Definition:Minimally Superinductive Class"
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The following pages link to Definition:Minimally Superinductive Class:
Displayed 27 items.
- Transfinite Recursion Theorem (← links)
- Principle of Superinduction (← links)
- Double Superinduction Principle (← links)
- Double Superinduction Principle/Lemma (← links)
- G-Tower is Nest/Lemma 2 (← links)
- G-Tower is Closed under Chain Unions (← links)
- Set which is Superinductive under Progressing Mapping has Fixed Point (← links)
- G-Tower is Closed under Mapping (← links)
- Set with Slowly Progressing Mapping on Power Set with Self as Fixed Point is Well-Orderable (← links)
- Cowen's Theorem (← links)
- Cowen's Theorem/Proof (← links)
- Cowen's Theorem/Also presented as (← links)
- Class of All Ordinals is Minimally Superinductive over Successor Mapping (← links)
- Minimally Superinductive Class is Well-Ordered under Subset Relation (← links)
- Characteristic of Extending Operation (← links)
- Transfinite Recursion Theorem/Formulation 1 (← links)
- Transfinite Recursion Theorem/Formulation 1/Proof 1 (← links)
- Transfinite Recursion Theorem/Formulation 1/Proof 2 (← links)
- Class Mapping has Minimally Superinductive Class (← links)
- Category:Proof by Superinduction (← links)
- Category:Double Superinduction Principle (← links)
- Category:G-Towers (← links)
- Category:Cowen's Theorem (← links)
- Category:Transfinite Recursion Theorem (← links)
- Category:Minimally Superinductive Classes (transclusion) (← links)
- Definition:Superinductive Class (← links)
- Definition:G-Tower (← links)