Universe (set theory) in the context of Complement (set theory)

Universe (set theory) in the context of Complement (set theory)

Universe (set theory) Study page number 1 of 1

Play TriviaQuestions Online!

Skip to study material about Universe (set theory) in the context of "Complement (set theory)"

⭐ Core Definition: Universe (set theory)

In mathematics, and particularly in set theory, category theory, type theory, and the foundations of mathematics, a universe is a collection that contains all the entities one wishes to consider in a given situation.

In set theory, universes are often classes that contain (as elements) all sets for which one hopes to prove a particular theorem. These classes can serve as inner models for various axiomatic systems such as ZFC or Morse–Kelley set theory. Universes are of critical importance to formalizing concepts in category theory inside set-theoretical foundations. For instance, the canonical motivating example of a category is Set, the category of all sets, which cannot be formalized in a set theory without some notion of a universe.

↓ Menu

HINT:

In this Dossier

⭐ Core Definition: Universe (set theory)
Universe (set theory) in the context of Set complement

Universe (set theory) in the context of Set complement

In set theory, the complement of a set $A$ , often denoted by $A^{c}$ (or $A'$ ), is the set of elements not in $A$ .

When all elements in the universe, i.e. all elements under consideration, are considered to be members of a given set $U$ , the absolute complement of $A$ is the set of elements in $U$ that are not in $A$ .

View the full Wikipedia page for Set complement

↑ Return to Menu