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Noun Concept

Categories: Binary relations, Wellfoundedness

EN

well-founded relation well-founded set foundational relation Hereditarily well-founded set Noetherian induction

EN

In mathematics, a binary relation R is called well-founded on a class X if every non-empty subset S ⊆ X has a minimal element with respect to R, that is, an element m ∈ S not related by s R m for any s ∈ S. In other words, a relation is well founded if Some authors include an extra condition that R is set-like, i.e., that the elements less than any given element form a set. Wikipedia

Definitions

Relations

Sources

EN

In mathematics, a binary relation R is called well-founded on a class X if every non-empty subset S ⊆ X has a minimal element with respect to R, that is, an element m ∈ S not related by s R m for any s ∈ S. In other words, a relation is well founded if Some authors include an extra condition that R is set-like, i.e., that the elements less than any given element form a set. Wikipedia

Type of binary relation Wikidata

IS A

irreflexive relation

HAS PART

well-founded relation

PART OF

well-founded relation

DIFFERENT FROM

well-founded relation

Wikipedia

EN

well-founded relation

Wikidata

EN

well-founded relation, well-founded set

Wikipedia Redirections

EN

foundational relation, Hereditarily well-founded set, Noetherian induction, Noetherian recursion, Noetherian relation, well-founded, well-founded induction, Well-founded order, Well-founded recursion, well-founded relations, well-founded set, well-foundedness, well founded, wellfounded, Wellfounded induction, Wellfounded recursion, Wellfounded relation, wellfoundedness

Wikidata Alias

EN

wellfounded relation, wellfounded set