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In [[mathematics]], and in particular [[number theory]], '''Grimm's conjecture''' (named after C. A. Grimm) states that to each element of a set of consecutive [[composite number]]s one can assign a distinct prime that divides it. It was first published in ''[[American Mathematical Monthly]]'', 76(1969) 1126-1128. | |||
==Formal statement== | |||
Suppose ''n'' + 1, ''n'' + 2, …, ''n'' + ''k'' are all [[composite numbers]], then there are ''k'' distinct primes ''p''<sub>''i''</sub> such that ''p''<sub>''i''</sub> [[Divisor|divides]] ''n'' + ''i'' for 1 ≤ ''i'' ≤ ''k''. | |||
==Weaker version== | |||
A weaker, though still unproven, version of this conjecture goes: If there is no prime in the interval <math>[n+1, n+k]</math>, then <math>\prod_{x\le k}(n+x)</math> has at least k distinct [[prime divisor]]s. | |||
==See also== | |||
*[[Prime gap]] | |||
==References== | |||
*{{mathworld|urlname=GrimmsConjecture|title=Grimm's Conjecture}} | |||
*[[Richard K. Guy|Guy, R. K.]] "Grimm's Conjecture." §B32 in ''Unsolved Problems in Number Theory'', 3rd ed., [[Springer Science+Business Media]], pp. 133-134, 2004. ISBN 0-387-20860-7 | |||
[[Category:Conjectures about prime numbers]] | |||
Revision as of 18:27, 28 September 2013
In mathematics, and in particular number theory, Grimm's conjecture (named after C. A. Grimm) states that to each element of a set of consecutive composite numbers one can assign a distinct prime that divides it. It was first published in American Mathematical Monthly, 76(1969) 1126-1128.
Formal statement
Suppose n + 1, n + 2, …, n + k are all composite numbers, then there are k distinct primes pi such that pi divides n + i for 1 ≤ i ≤ k.
Weaker version
A weaker, though still unproven, version of this conjecture goes: If there is no prime in the interval , then has at least k distinct prime divisors.
![{\displaystyle [n+1,n+k]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/c3466c4d996bc7073045fc4c418c0bd9127e2c3a)
See also
References
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Here is my web site - cottagehillchurch.com - Guy, R. K. "Grimm's Conjecture." §B32 in Unsolved Problems in Number Theory, 3rd ed., Springer Science+Business Media, pp. 133-134, 2004. ISBN 0-387-20860-7