Cunningham chain
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In mathematics, a Cunningham chain is a certain sequence of prime numbers. Cunningham chains are named after mathematician A. J. C. Cunningham. They are also called chains of nearly doubled primes.
A Cunningham chain of the first kind of length n is a sequence of prime numbers (p1,...,pn) such that for all 1 ≤ i < n, pi+1 = 2 pi + 1. (Hence each term of such a chain except the last one is a Sophie Germain prime, and each term except the first is a safe prime).
It follows that p2 = 2p1 + 1, p3 = 4p1 + 3, p4 = 8p1 + 7, ..., pi = 2i − 1p1 + (2i − 1 − 1).
Similarly, a Cunningham chain of the second kind of length n is a sequence of prime numbers (p1,...,pn) such that for all 1 ≤ i < n, pi+1 = 2 pi - 1.
Cunningham chains are also sometimes generalized to sequences of prime numbers (p1,...,pn) such that for all 1 ≤ i < n, pi+1 = api + b for fixed coprime integers a, b; the resulting chains are called generalized Cunningham chains.
A Cunningham chain is called complete if it cannot be further extended, i.e., if the previous or next term in the chain would not be a prime number anymore.
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[edit] Largest known Cunningham chains
It follows from Dickson's conjecture and the broader Schinzel's hypothesis H, both widely believed to be true, that for every k there are infinitely many Cunningham chains of length k. There are, however, no known direct methods of generating such chains.
k | Kind | p1 (starting prime) | Digits | Year | Discoverer |
---|---|---|---|---|---|
2 | 1st | 48047305725×2172403 − 1 | 51910 | 2007 | D. Underbakke |
3 | 1st | 164210699973×226326 − 1 | 7937 | 2006 | M. Paridon |
4 | 1st | 119184698×5501# − 1 | 2354 | 2005 | J. Sun |
5 | 2nd | 1719674368×1447# + 1 | 613 | 2004 | D. Augustin |
6 | 2nd | 37783362904×1097# + 1 | 475 | 2006 | D. Augustin |
7 | 2nd | 414792720846×557# + 1 | 237 | 2006 | D. Augustin |
8 | 1st | 2×65728407627×431# − 1 | 186 | 2005 | D. Augustin |
9 | 1st | 65728407627×431# − 1 | 185 | 2005 | D. Augustin |
10 | 2nd | 145683282311×181# + 1 | 84 | 2005 | D. Augustin |
11 | 2nd | 2×(8428860×127# + 212148902055091) − 1 | 56 | 2006 | J. K. Andersen |
12 | 2nd | 8428860×127# + 212148902055091 | 56 | 2006 | J. K. Andersen |
13 | 1st | 1753286498051×71# − 1 | 39 | 2005 | D. Augustin |
14 | 1st | 9510321949318457733566099 | 25 | 2004 | J. K. Andersen |
15 | 1st | 11993367147962683402919 | 23 | 2004 | T. Alm, J. K. Andersen |
16 | 1st | 810433818265726529159 | 21 | 2002 | P. Carmody, P. Jobling |
q# denotes the primorial 2×3×5×7×...×q.
As of January 2007, the longest known Cunningham chain of either kind is of length 16. Such a chain of the second kind was discovered by Tony Forbes in 1997, starting with 3203000719597029781. A chain of the first kind was discovered by Phil Carmody and Paul Jobling in 2002, starting with 810433818265726529159.[1]
[edit] Congruences of Cunningham chains of the first kind
Let the odd prime p1 be the first prime of a Cunningham chain of the first kind. The first prime is odd, thus . Since each successive prime in the chain is pi + 1 = 2pi + 1 it follows that . Thus, , , and so forth.
The above property can be informally observed by considering the primes of a chain in base 2. (Note that, as with all bases, multiplying by the number of the base "shifts" the digits to the left.) When we consider pi + 1 = 2pi + 1 in base 2, we see that, by multiplying pi by 2, the least significant digit of pi becomes the secondmost least significant digit of pi + 1. Because pi is odd--that is, the least significant digit is 1 in base 2--we know that the secondmost least significant digit of pi + 1 is also 1. And, finally, we can see that pi + 1 will be odd due to the addition of 1 to 2pi. In this way, successive primes in a Cunningham chain are essentially shifted left in binary with ones filling in the least significant digits. For example, here is a complete length 6 chain which starts at 141361469:
Binary | Decimal |
1000011011010000000100111101 | 141361469 |
10000110110100000001001111011 | 282722939 |
100001101101000000010011110111 | 565445879 |
1000011011010000000100111101111 | 1130891759 |
10000110110100000001001111011111 | 2261783519 |
100001101101000000010011110111111 | 4523567039 |
[edit] References
- ^ a b Dirk Augustin, Cunningham Chain records
[edit] External links
- The Prime Glossary: Cunningham chain
- PrimeLinks++: Cunningham chain
- Sequence A005602 in OEIS: the first term of the lowest complete Cunningham Chains of the first kind of length n, for 1 <= n <= 14
- Sequence A005603 in OEIS: the first term of the lowest complete Cunningham Chains of the second kind with length n, for 1 <= n <= 15