Double Mersenne number
Template:Short description In mathematics, a double Mersenne number is a Mersenne number of the form
- <math>M_{M_p} = 2^{2^p-1}-1</math>
where p is prime.
ExamplesEdit
The first four terms of the sequence of double Mersenne numbers are<ref name="Caldwell">Chris Caldwell, Mersenne Primes: History, Theorems and Lists at the Prime Pages.</ref> (sequence A077586 in the OEIS):
- <math>M_{M_2} = M_3 = 7 </math>
- <math>M_{M_3} = M_7 = 127 </math>
- <math>M_{M_5} = M_{31} = 2147483647 </math>
- <math>M_{M_7} = M_{127} = 170141183460469231731687303715884105727 </math>
Double Mersenne primesEdit
Template:Infobox integer sequence
A double Mersenne number that is prime is called a double Mersenne prime. Since a Mersenne number Mp can be prime only if p is prime, (see Mersenne prime for a proof), a double Mersenne number <math>M_{M_p}</math> can be prime only if Mp is itself a Mersenne prime. For the first values of p for which Mp is prime, <math>M_{M_{p}}</math> is known to be prime for p = 2, 3, 5, 7 while explicit factors of <math>M_{M_{p}}</math> have been found for p = 13, 17, 19, and mersenne prime 31.
| <math>p</math> | <math>M_{p} = 2^p-1</math> | <math>M_{M_{p}} = 2^{2^p-1}-1</math> | factorization of <math>M_{M_{p}}</math> |
|---|---|---|---|
| 2 | 3 | prime | 7 |
| 3 | 7 | prime (triple) | 127 |
| 5 | 31 | prime | 2147483647 |
| 7 | 127 | prime (quadruple) | 170141183460469231731687303715884105727 |
| 11 | not prime | not prime | 47 × 131009 × 178481 × 724639 × 2529391927 × 70676429054711 × 618970019642690137449562111 × ... |
| 13 | 8191 | not prime | 338193759479 × 210206826754181103207028761697008013415622289 × ... |
| 17 | 131071 | not prime | 231733529 × 64296354767 × ... |
| 19 | 524287 | not prime | 62914441 × 5746991873407 × 2106734551102073202633922471 × 824271579602877114508714150039 × 65997004087015989956123720407169 × 4565880376922810768406683467841114102689 × ... |
| 23 | not prime | not prime | 2351 × 4513 × 13264529 × 76899609737 × ... |
| 29 | not prime | not prime | 1399 × 2207 × 135607 × 622577 × 16673027617 × 4126110275598714647074087 × ... |
| 31 | 2147483647 | not prime (triple mersenne number) | 295257526626031 × 87054709261955177 × 242557615644693265201 × 178021379228511215367151 × ... |
| 37 | not prime | not prime | |
| 41 | not prime | not prime | |
| 43 | not prime | not prime | |
| 47 | not prime | not prime | |
| 53 | not prime | not prime | |
| 59 | not prime | not prime | |
| 61 | 2305843009213693951 | unknown |
Thus, the smallest candidate for the next double Mersenne prime is <math>M_{M_{61}}</math>, or 22305843009213693951 − 1. Being approximately 1.695Template:E, this number is far too large for any currently known primality test. It has no prime factor below 1 × 1036.<ref>{{#invoke:citation/CS1|citation |CitationClass=web }}</ref> There are probably no other double Mersenne primes than the four known.<ref name="Caldwell"/><ref>I. J. Good. Conjectures concerning the Mersenne numbers. Mathematics of Computation vol. 9 (1955) p. 120-121 [retrieved 2012-10-19]</ref>
Smallest prime factor of <math>M_{M_{p}}</math> (where p is the nth prime) are
- 7, 127, 2147483647, 170141183460469231731687303715884105727, 47, 338193759479, 231733529, 62914441, 2351, 1399, 295257526626031, 18287, 106937, 863, 4703, 138863, 22590223644617, ... (next term is > 1 × 1036) (sequence A309130 in the OEIS)
Catalan–Mersenne number conjectureEdit
The recursively defined sequence
- <math>c_0 = 2</math>
- <math>c_{n+1} = 2^{c_n}-1 = M_{c_n}</math>
is called the sequence of Catalan–Mersenne numbers.<ref>{{#invoke:Template wrapper|{{#if:|list|wrap}}|_template=cite web |_exclude=urlname, _debug, id |url = https://mathworld.wolfram.com/{{#if:Catalan-MersenneNumber%7CCatalan-MersenneNumber.html}} |title = Catalan-Mersenne Number |author = Weisstein, Eric W. |website = MathWorld |access-date = |ref = Template:SfnRef }}</ref> The first terms of the sequence (sequence A007013 in the OEIS) are:
- <math>c_0 = 2 </math>
- <math>c_1 = 2^2-1 = 3 </math>
- <math>c_2 = 2^3-1 = 7 </math>
- <math>c_3 = 2^7-1 = 127 </math>
- <math>c_4 = 2^{127}-1 = 170141183460469231731687303715884105727 </math>
- <math>c_5 = 2^{170141183460469231731687303715884105727}-1 \approx 5.45431 \times 10^{51217599719369681875006054625051616349} \approx 10^{10^{37.70942}}</math>
Catalan discovered this sequence after the discovery of the primality of <math>M_{127}=c_4</math> by Lucas in 1876.<ref name="Caldwell"/><ref>Template:Cite journal (probably collected by the editor). Almost all of the questions are signed by Édouard Lucas as is number 92: Template:Quote The footnote (indicated by the star) written by the editor Eugène Catalan, is as follows: Template:Quote</ref><ref>L. E. Dickson, History of the theory of numbers. Volume 1: Divisibility and primality (1919). Published by Washington, Carnegie Institution of Washington.</ref>p. 22 Catalan conjectured that they are prime "up to a certain limit". Although the first five terms are prime, no known methods can prove that any further terms are prime (in any reasonable time) simply because they are too huge. However, if <math>c_5</math> is not prime, there is a chance to discover this by computing <math>c_5</math> modulo some small prime <math>p</math> (using recursive modular exponentiation). If the resulting residue is zero, <math>p</math> represents a factor of <math>c_5</math> and thus would disprove its primality. Since <math>c_5</math> is a Mersenne number, such a prime factor <math>p</math> would have to be of the form <math>2kc_4 +1</math>. Additionally, because <math>2^n-1</math> is composite when <math>n</math> is composite, the discovery of a composite term in the sequence would preclude the possibility of any further primes in the sequence.
If <math>c_5</math> were prime, it would also contradict the New Mersenne conjecture. It is known that <math>\frac{2^{c_4} + 1}{3}</math> is composite, with factor <math> 886407410000361345663448535540258622490179142922169401 = 5209834514912200c_4 + 1</math>.<ref name="Hoegge">New Mersenne Conjecture</ref>
In popular cultureEdit
In the Futurama movie The Beast with a Billion Backs, the double Mersenne number <math>M_{M_7}</math> is briefly seen in "an elementary proof of the Goldbach conjecture". In the movie, this number is known as a "Martian prime".
See alsoEdit
ReferencesEdit
Further readingEdit
External linksEdit
- {{#invoke:Template wrapper|{{#if:|list|wrap}}|_template=cite web
|_exclude=urlname, _debug, id |url = https://mathworld.wolfram.com/{{#if:DoubleMersenneNumber%7CDoubleMersenneNumber.html}} |title = Double Mersenne Number |author = Weisstein, Eric W. |website = MathWorld |access-date = |ref = Template:SfnRef }}
- Tony Forbes, A search for a factor of MM61 Template:Webarchive.
- Status of the factorization of double Mersenne numbers
- Double Mersennes Prime Search
- Operazione Doppi Mersennes
Template:Prime number classes Template:Classes of natural numbers Template:Mersenne