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What (who) is transitive closures - definition

IN SET THEORY, A SET WHOSE ELEMENTS ARE ALL SUBSETS

Transitive class; Transitive closure (set); Hereditarily transitive set; Transitive (set theory); Transitive closure (sets)

Reflexive transitive closure

MATHEMATICAL PROPERTY OF AN OPERATION

Closure (binary operation); Closed under; Set closure (mathematics); Abstract closure; Axiom of closure; Abstract closure operator; Additively closed; Closure property of multiplication; Reflexive transitive closure; Reflexive transitive symmetric closure; P closure (binary relation); P closure; Reflexive symmetric transitive closure; Equivalence closure; Closure property; Congruence closure; Closure of a relation

Two elements, x and y, are related by the reflexive transitive closure, R+, of a relation, R, if they are related by the transitive closure, R*, or they are the same element.

Transitive set

In set theory, a branch of mathematics, a set A is called transitive if either of the following equivalent conditions hold:

https://en.wikipedia.org/wiki/Transitive_set

Transitive alignment

GRAMMATICAL CASE

Transitive case

In linguistic typology, transitive alignment is a type of morphosyntactic alignment used in a small number of languages in which a single grammatical case is used to mark both arguments of a transitive verb, but not with the single argument of an intransitive verb. Such a situation, which is quite rare among the world's languages, has also been called a double-oblique clause structure.

https://en.wikipedia.org/wiki/Transitive_alignment

Wikipedia

Transitive set

In set theory, a branch of mathematics, a set $A$ is called transitive if either of the following equivalent conditions hold:

whenever $x\in A$ , and $y\in x$ , then $y\in A$ .
whenever $x\in A$ , and $x$ is not an urelement, then $x$ is a subset of $A$ .

Similarly, a class $M$ is transitive if every element of $M$ is a subset of $M$ .

https://en.wikipedia.org/wiki/Transitive set