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- Q990533 subject Q5519261.
- Q990533 subject Q6949769.
- Q990533 abstract "In number theory, a positive integer k is said to be an Erdős–Woods number if it has the following property:there exists a positive integer a such that in the sequence (a, a + 1, …, a + k) of consecutive integers, each of the elements has a non-trivial common factor with one of the endpoints. In other words, k is an Erdős–Woods number if there exists a positive integer a such that for each integer i between 0 and k, at least one of the greatest common divisors gcd(a, a + i) and gcd(a + i, a + k) is greater than 1.".
- Q990533 wikiPageWikiLink Q104752.
- Q990533 wikiPageWikiLink Q11538.
- Q990533 wikiPageWikiLink Q12479.
- Q990533 wikiPageWikiLink Q131752.
- Q990533 wikiPageWikiLink Q133250.
- Q990533 wikiPageWikiLink Q173746.
- Q990533 wikiPageWikiLink Q188804.
- Q990533 wikiPageWikiLink Q21199.
- Q990533 wikiPageWikiLink Q36161.
- Q990533 wikiPageWikiLink Q40254.
- Q990533 wikiPageWikiLink Q435660.
- Q990533 wikiPageWikiLink Q522994.
- Q990533 wikiPageWikiLink Q5519261.
- Q990533 wikiPageWikiLink Q6949769.
- Q990533 wikiPageWikiLink Q712488.
- Q990533 wikiPageWikiLink Q712514.
- Q990533 wikiPageWikiLink Q712639.
- Q990533 wikiPageWikiLink Q712744.
- Q990533 wikiPageWikiLink Q712794.
- Q990533 wikiPageWikiLink Q712966.
- Q990533 wikiPageWikiLink Q877945.
- Q990533 comment "In number theory, a positive integer k is said to be an Erdős–Woods number if it has the following property:there exists a positive integer a such that in the sequence (a, a + 1, …, a + k) of consecutive integers, each of the elements has a non-trivial common factor with one of the endpoints.".
- Q990533 label "Erdős–Woods number".