- Double Mersenne number
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In mathematics, a double Mersenne number is a Mersenne number of the form
where p is a Mersenne prime exponent.
Contents
The smallest double Mersenne numbers
The sequence of double Mersenne numbers begins [1]
Double Mersenne primes
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
can be prime only if Mp is itself a Mersenne prime. The first values of p for which Mp is prime are p = 2, 3, 5, 7, 13, 17, 19, 31, 61, 89. Of these, is known to be prime for p = 2, 3, 5, 7; for p = 13, 17, 19, and 31, explicit factors have been found showing that the corresponding double Mersenne numbers are not prime. Thus, the smallest candidate for the next double Mersenne prime is 
, or 22305843009213693951 − 1. Being approximately 1.695×10694127911065419641, this number is far too large for any currently known primality test. It has no prime factor below 4×1033.[2]Catalan–Mersenne number
Write M(p) instead of Mp. A special case of the double Mersenne numbers, namely the recursively defined sequence
is called the Catalan–Mersenne numbers.[3] It is said[1] that Catalan came up with this sequence after the discovery of the primality of M(127) = M(M(M(M(2)))) by Lucas in 1876.
Although the first five terms (up to M(127)) are prime, no known methods can decide if any more of these numbers are prime (in any reasonable time) simply because the numbers in question are too huge, unless a factor of M(M(127)) is discovered.
In popular culture
In the Futurama movie The Beast with a Billion Backs, the double Mersenne number
is briefly seen in "an elementary proof of the Goldbach conjecture". In the movie, this number is known as a "martian prime".See also
References
- ^ a b Chris Caldwell, Mersenne Primes: History, Theorems and Lists at the Prime Pages.
- ^ Tony Forbes, A search for a factor of MM61. Progress: 9 October 2008. This reports a high-water mark of 204204000000×(10019+1)×(261−1), above 4×1033. Retrieved on 2008-10-22.
- ^ Weisstein, Eric W., "Catalan-Mersenne Number" from MathWorld.
Further reading
- Dickson, L. E. (1971) [1919], History of the theory of numbers, New York: Chelsea Publishing.
External links
- Weisstein, Eric W., "Double Mersenne Number" from MathWorld.
- Tony Forbes, A search for a factor of MM61.
By formula Fermat (22n+1) · Mersenne (2p−1) · Double Mersenne (22p−1−1) · Wagstaff (2p+1)/3 · Proth (k·2n+1) · Factorial (n!±1) · Primorial (pn#±1) · Euclid (pn#+1) · Pythagorean (4n+1) · Pierpont (2u·3v+1) · Solinas (2a±2b±1) · Cullen (n·2n+1) · Woodall (n·2n−1) · Cuban (x3−y3)/(x−y) · Carol (2n−1)2−2 · Kynea (2n+1)2−2 · Leyland (xy+yx) · Thabit (3·2n−1) · Mills (floor(A3n))By integer sequence By property Lucky · Wall-Sun-Sun · Wilson · Wieferich · Wieferich pair · Fortunate · Ramanujan · Pillai · Regular · Strong · Stern · Supersingular (elliptic curve) · Supersingular (moonshine theory) · Wolstenholme · Good · Super · Higgs · Highly cototient · IllegalBase-dependent Happy · Dihedral · Palindromic · Emirp · Repunit · Permutable · Strobogrammatic · Minimal · Full reptend · Unique · Primeval · Self · Smarandache–WellinPatterns Twin (p, p+2) · Triplet (p, p+2 or p+4, p+6) · Quadruplet (p, p+2, p+6, p+8) · Tuple · Cousin (p, p+4) · Sexy (p, p+6) · Chen · Sophie Germain (p, 2p+1) · Cunningham chain (p, 2p±1, …) · Safe (p, (p−1)/2) · Arithmetic progression (p+a·n, n=0,1,…) · Balanced (consecutive p−n, p, p+n)By size Complex numbers Composite numbers Related topics Categories:- Integer sequences
- Large integers
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