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bn:01082673n
Noun Concept
Categories: Axiom of choice, Cardinal numbers, Mathematical logic, Theorems in the foundations of mathematics
EN
König's theorem  Koenig's theorem  Koenig theorem  Konig's theorem  Konig theorem
EN
In set theory, König's theorem states that if the axiom of choice holds, I is a set, κ i {\displaystyle \kappa _{i}} and λ i {\displaystyle \lambda _{i}} are cardinal numbers for every i in I, and κ i < λ i {\displaystyle \kappa _{i}<\lambda _{i}} for every i in I, then ∑ i ∈ I κ i < ∏ i ∈ I λ i. Wikipedia
English:
set theory
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EN
In set theory, König's theorem states that if the axiom of choice holds, I is a set, κ i {\displaystyle \kappa _{i}} and λ i {\displaystyle \lambda _{i}} are cardinal numbers for every i in I, and κ i < λ i {\displaystyle \kappa _{i}<\lambda _{i}} for every i in I, then ∑ i ∈ I κ i < ∏ i ∈ I λ i. Wikipedia
Theorem Wikidata
IS A
theorem
equivalent of the axiom of choice
NAMED AFTER
Gyula Kőnig
SAID TO BE THE SAME AS
axiom of choice
Wikipedia
EN
König's theorem (set theory)
Wikidata
EN
König's theorem
Wikipedia Redirections
EN
Koenig's theorem (set theory), Koenig theorem (set theory), Konig's theorem (set theory), Konig theorem (set theory), König theorem (set theory), Kőnig's theorem (set theory)

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