In number theory, a Carmichael number is a composite number which in modular arithmetic satisfies the congruence relation:

for all integers .[1] The relation may also be expressed[2] in the form:

for all integers that are relatively prime to . They are infinite in number.[3]

Robert Daniel Carmichael

They constitute the comparatively rare instances where the strict converse of Fermat's Little Theorem does not hold. This fact precludes the use of that theorem as an absolute test of primality.[4]

The Carmichael numbers form the subset K1 of the Knödel numbers.

The Carmichael numbers were named after the American mathematician Robert Carmichael by Nicolaas Beeger, in 1950. Øystein Ore had referred to them in 1948 as numbers with the "Fermat property", or "F numbers" for short.[5]

Overview

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Fermat's little theorem states that if   is a prime number, then for any integer  , the number   is an integer multiple of  . Carmichael numbers are composite numbers which have the same property. Carmichael numbers are also called Fermat pseudoprimes or absolute Fermat pseudoprimes. A Carmichael number will pass a Fermat primality test to every base   relatively prime to the number, even though it is not actually prime. This makes tests based on Fermat's Little Theorem less effective than strong probable prime tests such as the Baillie–PSW primality test and the Miller–Rabin primality test.

However, no Carmichael number is either an Euler–Jacobi pseudoprime or a strong pseudoprime to every base relatively prime to it[6] so, in theory, either an Euler or a strong probable prime test could prove that a Carmichael number is, in fact, composite.

Arnault[7] gives a 397-digit Carmichael number   that is a strong pseudoprime to all prime bases less than 307:

 

where

  2 9674495668 6855105501 5417464290 5332730771 9917998530 4335099507 5531276838 7531717701 9959423859 6428121188 0336647542 1834556249 3168782883

is a 131-digit prime.   is the smallest prime factor of  , so this Carmichael number is also a (not necessarily strong) pseudoprime to all bases less than  .

As numbers become larger, Carmichael numbers become increasingly rare. For example, there are 20,138,200 Carmichael numbers between 1 and 1021 (approximately one in 50 trillion (5·1013) numbers).[8]

Korselt's criterion

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An alternative and equivalent definition of Carmichael numbers is given by Korselt's criterion.

Theorem (A. Korselt 1899): A positive composite integer   is a Carmichael number if and only if   is square-free, and for all prime divisors   of  , it is true that  .

It follows from this theorem that all Carmichael numbers are odd, since any even composite number that is square-free (and hence has only one prime factor of two) will have at least one odd prime factor, and thus   results in an even dividing an odd, a contradiction. (The oddness of Carmichael numbers also follows from the fact that   is a Fermat witness for any even composite number.) From the criterion it also follows that Carmichael numbers are cyclic.[9][10] Additionally, it follows that there are no Carmichael numbers with exactly two prime divisors.

Discovery

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The first seven Carmichael numbers, from 561 to 8911, were all found by the Czech mathematician Václav Šimerka in 1885[11] (thus preceding not just Carmichael but also Korselt, although Šimerka did not find anything like Korselt's criterion).[12] His work, published in Czech scientific journal Časopis pro pěstování matematiky a fysiky, however, remained unnoticed.

 
Václav Šimerka listed the first seven Carmichael numbers

Korselt was the first who observed the basic properties of Carmichael numbers, but he did not give any examples.

That 561 is a Carmichael number can be seen with Korselt's criterion. Indeed,   is square-free and  ,   and  . The next six Carmichael numbers are (sequence A002997 in the OEIS):

 
 
 
 
 
 

In 1910, Carmichael himself[13] also published the smallest such number, 561, and the numbers were later named after him.

Jack Chernick[14] proved a theorem in 1939 which can be used to construct a subset of Carmichael numbers. The number   is a Carmichael number if its three factors are all prime. Whether this formula produces an infinite quantity of Carmichael numbers is an open question (though it is implied by Dickson's conjecture).

Paul Erdős heuristically argued there should be infinitely many Carmichael numbers. In 1994 W. R. (Red) Alford, Andrew Granville and Carl Pomerance used a bound on Olson's constant to show that there really do exist infinitely many Carmichael numbers. Specifically, they showed that for sufficiently large  , there are at least   Carmichael numbers between 1 and  .[3]

Thomas Wright proved that if   and   are relatively prime, then there are infinitely many Carmichael numbers in the arithmetic progression  , where  .[15]

Löh and Niebuhr in 1992 found some very large Carmichael numbers, including one with 1,101,518 factors and over 16 million digits. This has been improved to 10,333,229,505 prime factors and 295,486,761,787 digits,[16] so the largest known Carmichael number is much greater than the largest known prime.

Properties

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Factorizations

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Carmichael numbers have at least three positive prime factors. The first Carmichael numbers with   prime factors are (sequence A006931 in the OEIS):

k  
3  
4  
5  
6  
7  
8  
9  

The first Carmichael numbers with 4 prime factors are (sequence A074379 in the OEIS):

i  
1  
2  
3  
4  
5  
6  
7  
8  
9  
10  

The second Carmichael number (1105) can be expressed as the sum of two squares in more ways than any smaller number. The third Carmichael number (1729) is the Hardy-Ramanujan Number: the smallest number that can be expressed as the sum of two cubes (of positive numbers) in two different ways.

Distribution

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Let   denote the number of Carmichael numbers less than or equal to  . The distribution of Carmichael numbers by powers of 10 (sequence A055553 in the OEIS):[8]

  1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21
  0 0 1 7 16 43 105 255 646 1547 3605 8241 19279 44706 105212 246683 585355 1401644 3381806 8220777 20138200

In 1953, Knödel proved the upper bound:

 

for some constant  .

In 1956, Erdős improved the bound to

 

for some constant  .[17] He further gave a heuristic argument suggesting that this upper bound should be close to the true growth rate of  .

In the other direction, Alford, Granville and Pomerance proved in 1994[3] that for sufficiently large X,

 

In 2005, this bound was further improved by Harman[18] to

 

who subsequently improved the exponent to  .[19]

Regarding the asymptotic distribution of Carmichael numbers, there have been several conjectures. In 1956, Erdős[17] conjectured that there were   Carmichael numbers for X sufficiently large. In 1981, Pomerance[20] sharpened Erdős' heuristic arguments to conjecture that there are at least

 

Carmichael numbers up to  , where  .

However, inside current computational ranges (such as the counts of Carmichael numbers performed by Pinch[8] up to 1021), these conjectures are not yet borne out by the data.

In 2021, Daniel Larsen proved an analogue of Bertrand's postulate for Carmichael numbers first conjectured by Alford, Granville, and Pomerance in 1994.[4][21] Using techniques developed by Yitang Zhang and James Maynard to establish results concerning small gaps between primes, his work yielded the much stronger statement that, for any   and sufficiently large   in terms of  , there will always be at least

 

Carmichael numbers between   and

 

Generalizations

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The notion of Carmichael number generalizes to a Carmichael ideal in any number field  . For any nonzero prime ideal   in  , we have   for all   in  , where   is the norm of the ideal  . (This generalizes Fermat's little theorem, that   for all integers   when   is prime.) Call a nonzero ideal   in   Carmichael if it is not a prime ideal and   for all  , where   is the norm of the ideal  . When   is  , the ideal   is principal, and if we let   be its positive generator then the ideal   is Carmichael exactly when   is a Carmichael number in the usual sense.

When   is larger than the rationals it is easy to write down Carmichael ideals in  : for any prime number   that splits completely in  , the principal ideal   is a Carmichael ideal. Since infinitely many prime numbers split completely in any number field, there are infinitely many Carmichael ideals in  . For example, if   is any prime number that is 1 mod 4, the ideal   in the Gaussian integers   is a Carmichael ideal.

Both prime and Carmichael numbers satisfy the following equality:

 

Lucas–Carmichael number

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A positive composite integer   is a Lucas–Carmichael number if and only if   is square-free, and for all prime divisors   of  , it is true that  . The first Lucas–Carmichael numbers are:

399, 935, 2015, 2915, 4991, 5719, 7055, 8855, 12719, 18095, 20705, 20999, 22847, 29315, 31535, 46079, 51359, 60059, 63503, 67199, 73535, 76751, 80189, 81719, 88559, 90287, ... (sequence A006972 in the OEIS)

Quasi–Carmichael number

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Quasi–Carmichael numbers are squarefree composite numbers   with the property that for every prime factor   of  ,   divides   positively with   being any integer besides 0. If  , these are Carmichael numbers, and if  , these are Lucas–Carmichael numbers. The first Quasi–Carmichael numbers are:

35, 77, 143, 165, 187, 209, 221, 231, 247, 273, 299, 323, 357, 391, 399, 437, 493, 527, 561, 589, 598, 713, 715, 899, 935, 943, 989, 1015, 1073, 1105, 1147, 1189, 1247, 1271, 1295, 1333, 1517, 1537, 1547, 1591, 1595, 1705, 1729, ... (sequence A257750 in the OEIS)

Knödel number

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An n-Knödel number for a given positive integer n is a composite number m with the property that each   coprime to m satisfies  . The   case are Carmichael numbers.

Higher-order Carmichael numbers

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Carmichael numbers can be generalized using concepts of abstract algebra.

The above definition states that a composite integer n is Carmichael precisely when the nth-power-raising function pn from the ring Zn of integers modulo n to itself is the identity function. The identity is the only Zn-algebra endomorphism on Zn so we can restate the definition as asking that pn be an algebra endomorphism of Zn. As above, pn satisfies the same property whenever n is prime.

The nth-power-raising function pn is also defined on any Zn-algebra A. A theorem states that n is prime if and only if all such functions pn are algebra endomorphisms.

In-between these two conditions lies the definition of Carmichael number of order m for any positive integer m as any composite number n such that pn is an endomorphism on every Zn-algebra that can be generated as Zn-module by m elements. Carmichael numbers of order 1 are just the ordinary Carmichael numbers.

An order-2 Carmichael number

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According to Howe, 17 · 31 · 41 · 43 · 89 · 97 · 167 · 331 is an order 2 Carmichael number. This product is equal to 443,372,888,629,441.[22]

Properties

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Korselt's criterion can be generalized to higher-order Carmichael numbers, as shown by Howe.

A heuristic argument, given in the same paper, appears to suggest that there are infinitely many Carmichael numbers of order m, for any m. However, not a single Carmichael number of order 3 or above is known.

Notes

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  1. ^ Riesel, Hans (1994). Prime Numbers and Computer Methods for Factorization. Progress in Mathematics. Vol. 126 (second ed.). Boston, MA: Birkhäuser. ISBN 978-0-8176-3743-9. Zbl 0821.11001.
  2. ^ Crandall, Richard; Pomerance, Carl (2005). Prime Numbers: A Computational Perspective (second ed.). New York: Springer. pp. 133–134. ISBN 978-0387-25282-7.
  3. ^ a b c W. R. Alford; Andrew Granville; Carl Pomerance (1994). "There are Infinitely Many Carmichael Numbers" (PDF). Annals of Mathematics. 140 (3): 703–722. doi:10.2307/2118576. JSTOR 2118576. Archived (PDF) from the original on 2005-03-04.
  4. ^ a b Cepelewicz, Jordana (13 October 2022). "Teenager Solves Stubborn Riddle About Prime Number Look-Alikes". Quanta Magazine. Retrieved 13 October 2022.
  5. ^ Ore, Øystein (1948). Number Theory and Its History. New York: McGraw-Hill. pp. 331–332 – via Internet Archive.
  6. ^ D. H. Lehmer (1976). "Strong Carmichael numbers". J. Austral. Math. Soc. 21 (4): 508–510. doi:10.1017/s1446788700019364. Lehmer proved that no Carmichael number is an Euler-Jacobi pseudoprime to every base relatively prime to it. He used the term strong pseudoprime, but the terminology has changed since then. Strong pseudoprimes are a subset of Euler-Jacobi pseudoprimes. Therefore, no Carmichael number is a strong pseudoprime to every base relatively prime to it.
  7. ^ F. Arnault (August 1995). "Constructing Carmichael Numbers Which Are Strong Pseudoprimes to Several Bases". Journal of Symbolic Computation. 20 (2): 151–161. doi:10.1006/jsco.1995.1042.
  8. ^ a b c Pinch, Richard (December 2007). Anne-Maria Ernvall-Hytönen (ed.). The Carmichael numbers up to 1021 (PDF). Proceedings of Conference on Algorithmic Number Theory. Vol. 46. Turku, Finland: Turku Centre for Computer Science. pp. 129–131. Retrieved 2017-06-26.
  9. ^ Carmichael Multiples of Odd Cyclic Numbers "Any divisor of a Carmichael number must be an odd cyclic number"
  10. ^ Proof sketch: If   is square-free but not cyclic,   for two prime factors   and   of  . But if   satisfies Korselt then  , so by transitivity of the "divides" relation  . But   is also a factor of  , a contradiction.
  11. ^ Šimerka, Václav (1885). "Zbytky z arithmetické posloupnosti" [On the remainders of an arithmetic progression]. Časopis pro pěstování mathematiky a fysiky. 14 (5): 221–225. doi:10.21136/CPMF.1885.122245.
  12. ^ Lemmermeyer, F. (2013). "Václav Šimerka: quadratic forms and factorization". LMS Journal of Computation and Mathematics. 16: 118–129. doi:10.1112/S1461157013000065.
  13. ^ R. D. Carmichael (1910). "Note on a new number theory function". Bulletin of the American Mathematical Society. 16 (5): 232–238. doi:10.1090/s0002-9904-1910-01892-9.
  14. ^ Chernick, J. (1939). "On Fermat's simple theorem" (PDF). Bull. Amer. Math. Soc. 45 (4): 269–274. doi:10.1090/S0002-9904-1939-06953-X.
  15. ^ Thomas Wright (2013). "Infinitely many Carmichael Numbers in Arithmetic Progressions". Bull. London Math. Soc. 45 (5): 943–952. arXiv:1212.5850. doi:10.1112/blms/bdt013. S2CID 119126065.
  16. ^ W.R. Alford; et al. (2014). "Constructing Carmichael numbers through improved subset-product algorithms". Math. Comp. 83 (286): 899–915. arXiv:1203.6664. doi:10.1090/S0025-5718-2013-02737-8. S2CID 35535110.
  17. ^ a b Erdős, P. (2022). "On pseudoprimes and Carmichael numbers" (PDF). Publ. Math. Debrecen. 4 (3–4): 201–206. doi:10.5486/PMD.1956.4.3-4.16. MR 0079031. S2CID 253789521. Archived (PDF) from the original on 2011-06-11.
  18. ^ Glyn Harman (2005). "On the number of Carmichael numbers up to x". Bulletin of the London Mathematical Society. 37 (5): 641–650. doi:10.1112/S0024609305004686. S2CID 124405969.
  19. ^ Harman, Glyn (2008). "Watt's mean value theorem and Carmichael numbers". International Journal of Number Theory. 4 (2): 241–248. doi:10.1142/S1793042108001316. MR 2404800.
  20. ^ Pomerance, C. (1981). "On the distribution of pseudoprimes". Math. Comp. 37 (156): 587–593. doi:10.1090/s0025-5718-1981-0628717-0. JSTOR 2007448.
  21. ^ Larsen, Daniel (20 July 2022). "Bertrand's Postulate for Carmichael Numbers". International Mathematics Research Notices. 2023 (15): 13072–13098. arXiv:2111.06963. doi:10.1093/imrn/rnac203.
  22. ^ Everett W. Howe (October 2000). "Higher-order Carmichael numbers". Mathematics of Computation. 69 (232): 1711–1719. arXiv:math.NT/9812089. Bibcode:2000MaCom..69.1711H. doi:10.1090/s0025-5718-00-01225-4. JSTOR 2585091. S2CID 6102830.

References

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