Pages that link to "Mathematician:Wilson M. Zaring"
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The following pages link to Mathematician:Wilson M. Zaring:
Displayed 50 items.
- Russell's Paradox (← links)
- Set Difference with Self is Empty Set (← links)
- Set Equivalence behaves like Equivalence Relation (← links)
- Cantor's Theorem (← links)
- Cantor-Bernstein-Schröder Theorem (← links)
- Identity Mapping is Order Isomorphism (← links)
- Inverse of Order Isomorphism is Order Isomorphism (← links)
- Composite of Order Isomorphisms is Order Isomorphism (← links)
- Equality of Natural Numbers (← links)
- Cardinality of Power Set of Finite Set (← links)
- Division Theorem (← links)
- Initial Segment of Ordinal is Ordinal (← links)
- Intersection of Two Ordinals is Ordinal (← links)
- Dirichlet's Box Principle (← links)
- Order Isomorphism on Well-Ordered Set preserves Well-Ordering (← links)
- Natural Number Addition is Closed (← links)
- Subset of Finite Set is Finite (← links)
- Axiom of Subsets Equivalents (← links)
- Empty Set is Small (← links)
- Equality is Reflexive (← links)
- Equality is Symmetric (← links)
- Strictly Well-Founded Relation has no Relational Loops (← links)
- No Membership Loops (← links)
- Element of Transitive Class (← links)
- Alternative Definition of Ordinal (← links)
- Class of All Ordinals is Ordinal (← links)
- Transitive Set is Proper Subset of Ordinal iff Element of Ordinal (← links)
- Ordinal is Member of Class of All Ordinals (← links)
- Ordinal is Subset of Class of All Ordinals (← links)
- Equality is Transitive (← links)
- Minimally Inductive Set forms Peano Structure (← links)
- Transfinite Induction/Principle 1 (← links)
- Transfinite Recursion Theorem/Theorem 1 (← links)
- Proper Well-Ordering determines Smallest Elements (← links)
- Well-Ordered Induction (← links)
- Subset of Ordinals has Minimal Element (← links)
- Union of Ordinals is Least Upper Bound (← links)
- Ordinal is Less than Successor (← links)
- No Largest Ordinal (← links)
- Minimally Inductive Set is Ordinal (← links)
- Minimally Inductive Set is Limit Ordinal (← links)
- No Infinitely Descending Membership Chains (← links)
- Ordinals Isomorphic to the Same Well-Ordered Set (← links)
- Transfinite Recursion Theorem/Uniqueness (← links)
- Transfinite Recursion Theorem/Theorem 2 (← links)
- Transfinite Recursion Theorem/Corollary (← links)
- Well-Ordered Transitive Subset is Equal or Equal to Initial Segment (← links)
- Condition for Injective Mapping on Ordinals (← links)
- Maximal Injective Mapping from Ordinals to a Set (← links)
- Order Isomorphism between Ordinals and Proper Class/Lemma (← links)