Kenneth Kunen — Herbert Kenneth Kunen (August 2, 1943 – ) is an emeritus professor of mathematics at the University of Wisconsin Madison [http://www.math.wisc.edu/ apache/emeriti.html] who works in set theory and its applications to various areas of mathematics … Wikipedia
Kunen — may refer to: *Kenneth Kunen, American educator *Acharkut, Armenia *Kirants, Armenia … Wikipedia
Reinhardt cardinal — In set theory, a branch of mathematics, a Reinhardt cardinal is a large cardinal kappa;, suggested by harvs|txt=yes|last=Reinhardt|year=1967|year2=1974, that is the critical point of a non trivial elementary embedding j of V into itself.A minor… … Wikipedia
Liste de personnes par nombre d'Erdős — Voici une liste non exhaustive de personnes ayant un nombre d Erdős de 0, 1 ou 2. Sommaire 1 #0 2 #1 3 #2 4 Référence … Wikipédia en Français
Huge cardinal — In mathematics, a cardinal number κ is called huge if there exists an elementary embedding j : V → M from V into a transitive inner model M with critical point κ and Here, αM is the class of all sequences of length α whose elements are in M … Wikipedia
Skolem's paradox — is the mathematical fact that every countable axiomatisation of set theory in first order logic, if consistent, has a model that is countable, even if it is possible to prove, from those same axioms, the existence of sets that are not countable.… … Wikipedia
Zermelo–Fraenkel set theory — Zermelo–Fraenkel set theory, with the axiom of choice, commonly abbreviated ZFC, is the standard form of axiomatic set theory and as such is the most common foundation of mathematics.ZFC consists of a single primitive ontological notion, that of… … Wikipedia
Set-theoretic topology — In mathematics, set theoretic topology is a subject that combines set theory and general topology. It focuses on topological questions that are independent of ZFC.References*cite book|title=Handbook of Set Theoretic… … Wikipedia
Forcing — En mathématiques, et plus précisément en logique mathématique, le forcing est une technique inventée par Paul Cohen pour prouver des résultats de cohérence et d indépendance en théorie des ensembles. Elle a été utilisée pour la première fois en… … Wikipédia en Français
Cardinal inaccessible — En mathématiques, et plus précisément en théorie des ensembles, un cardinal inaccessible est un cardinal ne pouvant être construit à partir de cardinaux plus petits à l aide des axiomes de ZFC ; cette propriété fait qu un cardinal… … Wikipédia en Français
