Английская Википедия:Cousin prime

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Шаблон:Short description

In number theory, cousin primes are prime numbers that differ by four.[1] Compare this with twin primes, pairs of prime numbers that differ by two, and sexy primes, pairs of prime numbers that differ by six.

The cousin primes (sequences Шаблон:OEIS2C and Шаблон:OEIS2C in OEIS) below 1000 are:

(3, 7), (7, 11), (13, 17), (19, 23), (37, 41), (43, 47), (67, 71), (79, 83), (97, 101), (103, 107), (109, 113), (127, 131), (163, 167), (193, 197), (223, 227), (229, 233), (277, 281), (307, 311), (313, 317), (349, 353), (379, 383), (397, 401), (439, 443), (457, 461), (463,467), (487, 491), (499, 503), (613, 617), (643, 647), (673, 677), (739, 743), (757, 761), (769, 773), (823, 827), (853, 857), (859, 863), (877, 881), (883, 887), (907, 911), (937, 941), (967, 971)

Properties

The only prime belonging to two pairs of cousin primes is 7. One of the numbers Шаблон:Math will always be divisible by 3, so Шаблон:Math is the only case where all three are primes.

An example of a large proven cousin prime pair is Шаблон:Math for

<math>p = 4111286921397 \times 2^{66420} + 1</math>

which has 20008 digits. In fact, this is part of a prime triple since Шаблон:Mvar is also a twin prime (because Шаблон:Math is also a proven prime).

Шаблон:As of, the largest-known pair of cousin primes was found by S. Batalov and has 51,934 digits. The primes are:

<math>p = 29055814795 \times (2^{172486} - 2^{86243}) + 2^{86245} - 3</math>
<math>p+4 = 29055814795 \times (2^{172486} - 2^{86243}) + 2^{86245} + 1</math>[2]

If the first Hardy–Littlewood conjecture holds, then cousin primes have the same asymptotic density as twin primes. An analogue of Brun's constant for twin primes can be defined for cousin primes, called Brun's constant for cousin primes, with the initial term (3, 7) omitted, by the convergent sum:[3]

<math>B_4 = \left(\frac{1}{7} + \frac{1}{11}\right) + \left(\frac{1}{13} + \frac{1}{17}\right) + \left(\frac{1}{19} + \frac{1}{23}\right) + \cdots.</math>

Using cousin primes up to 242, the value of Шаблон:Math was estimated by Marek Wolf in 1996 as

<math>B_4 \approx 1.1970449</math>[4]

This constant should not be confused with Brun's constant for prime quadruplets, which is also denoted Шаблон:Math.

The Skewes number for cousin primes is 5206837 (Шаблон:Harvtxt).

Notes

Шаблон:Reflist

References

Шаблон:Prime number classes