Set theory: Difference between revisions
Jump to navigation
Jump to search
no edit summary
RhubarbJayde (talk | contribs) No edit summary |
RhubarbJayde (talk | contribs) No edit summary |
||
Line 1:
Set theory is a branch of mathematics involving the study of [[Set|sets]]. These are collections of objects. Set theory is often used as a foundation for mathematics, as many mathematical objects (such as [[natural numbers]], groups, topological spaces, ...) can all be encoded as sets. In pure set theory, the primary objects of study are [[infinite]] sets, which include infinite [[Ordinal|ordinals]] and [[Cardinal|cardinals]]. Set theory is the basis for a lot of apeirology, as it provides a basis for formalising or defining apeirological concepts, and has introduced useful techniques for proof such as Mostowski collapse, or Skolem hull. Set theory is very broad, and is comprised of many other subjects such as [[proof theory]] and [[model theory]].
|