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- Controversy_over_Cantor's_theory abstract "In mathematical logic, the theory of infinite sets was first developed by Georg Cantor. Although this work has become a thoroughly standard fixture of classical set theory, it has been criticized in several areas by mathematicians and philosophers. Cantor's theorem is that there are sets having cardinality greater than the (already infinite) cardinality of the set of whole numbers {1,2,3,...}. Cantor's work gave rise to some remarks from Kronecker and others. Logician Wilfrid Hodges (1998) has commented on the energy devoted to refuting this "harmless little argument" (i.e. Cantor's diagonal argument) asking, "what had it done to anyone to make them angry with it?"".
- Controversy_over_Cantor's_theory wikiPageExternalLink Poincare.pdf.
- Controversy_over_Cantor's_theory wikiPageExternalLink Opinion68.html.
- Controversy_over_Cantor's_theory wikiPageExternalLink the_uniform_solution_of_the_paradoxes.
- Controversy_over_Cantor's_theory wikiPageExternalLink Cantor-Beweis.html.
- Controversy_over_Cantor's_theory wikiPageID "2667603".
- Controversy_over_Cantor's_theory wikiPageRevisionID "594985837".
- Controversy_over_Cantor's_theory authorlink "Wilfrid Hodges".
- Controversy_over_Cantor's_theory date "January 2014".
- Controversy_over_Cantor's_theory first "Wilfrid".
- Controversy_over_Cantor's_theory hasPhotoCollection Controversy_over_Cantor's_theory.
- Controversy_over_Cantor's_theory last "Hodges".
- Controversy_over_Cantor's_theory reason "According to the article Cantor's theorem, the theorem states that no set at all can be correlated one-to-one with all its subsets. No axiom of infinity is needed for its proof.".
- Controversy_over_Cantor's_theory txt "yes".
- Controversy_over_Cantor's_theory year "1998".
- Controversy_over_Cantor's_theory subject Category:Discovery_and_invention_controversies.
- Controversy_over_Cantor's_theory subject Category:History_of_mathematics.
- Controversy_over_Cantor's_theory subject Category:Philosophy_of_mathematics.
- Controversy_over_Cantor's_theory subject Category:Set_theory.
- Controversy_over_Cantor's_theory type Abstraction100002137.
- Controversy_over_Cantor's_theory type Act100030358.
- Controversy_over_Cantor's_theory type Controversies.
- Controversy_over_Cantor's_theory type Controversy107183151.
- Controversy_over_Cantor's_theory type Disagreement107180787.
- Controversy_over_Cantor's_theory type Dispute107181935.
- Controversy_over_Cantor's_theory type Event100029378.
- Controversy_over_Cantor's_theory type PsychologicalFeature100023100.
- Controversy_over_Cantor's_theory type SpeechAct107160883.
- Controversy_over_Cantor's_theory type YagoPermanentlyLocatedEntity.
- Controversy_over_Cantor's_theory comment "In mathematical logic, the theory of infinite sets was first developed by Georg Cantor. Although this work has become a thoroughly standard fixture of classical set theory, it has been criticized in several areas by mathematicians and philosophers. Cantor's theorem is that there are sets having cardinality greater than the (already infinite) cardinality of the set of whole numbers {1,2,3,...}. Cantor's work gave rise to some remarks from Kronecker and others.".
- Controversy_over_Cantor's_theory label "Controversy over Cantor's theory".
- Controversy_over_Cantor's_theory sameAs Q5166024.
- Controversy_over_Cantor's_theory sameAs Q5166024.
- Controversy_over_Cantor's_theory sameAs Controversy_over_Cantor's_theory.
- Controversy_over_Cantor's_theory wasDerivedFrom Controversy_over_Cantor's_theory?oldid=594985837.
- Controversy_over_Cantor's_theory isPrimaryTopicOf Controversy_over_Cantor's_theory.