Twin primes

Definition

The term twin primes is used for a pair of odd prime numbers that differ by two. In other words, primes ${\displaystyle p,p+2}$ are termed twin primes. Either member of a pair of twin primes may be referred to as a twin prime.

The twin prime conjecture states that there are infinitely many twin primes.

Relation with other properties

Related properties for pairs of primes

Property	Meaning	Comment
Cousin primes	two primes that differ by ${\displaystyle 4}$	Note that for ${\displaystyle p>3}$, if both ${\displaystyle p}$ and ${\displaystyle p+4}$ are prime, ${\displaystyle p+2}$ is not prime. Hence, the prime gap in this case is ${\displaystyle 4}$.
Sexy primes	two primes that differ by ${\displaystyle 6}$ (with no prime in between)	Since this is a pair of successive primes, the prime gap is ${\displaystyle 6}$.
Sophie Germain prime	a prime ${\displaystyle p}$ such that ${\displaystyle 2p+1}$ is also prime	the corresponding prime ${\displaystyle 2p+1}$ is a safe prime
safe prime	a prime ${\displaystyle p}$ such that ${\displaystyle (p-1)/2}$ is also prime	the corresponding prime ${\displaystyle (p-1)/2}$ is a Sophie Germain prime

Related properties for primes

• Chen prime is a prime number ${\displaystyle p}$ such that ${\displaystyle p+2}$ is either a prime number or a semiprime. The name arises because of Chen's theorem on primes and semiprimes with fixed separation, which essentially asserts that for any fixed separation, there are infinitely many pairs of a prime and a semiprime having that separation.

Related properties for more than two primes

Property	Meaning	Comment
Prime quadruplet	a collection of four primes ${\displaystyle p,p+2,p+6,p+8}$	there can be no further primes in between
Prime constellation	a sequence of consecutive primes ${\displaystyle p_{1}<p_{2}<\dots <p_{k}}$ for which the difference between the first and last prime is the least possible based on considerations of modular arithmetic relative to smaller primes	we are usually interested in prime constellation having a particular constellation pattern.

Related facts/conjectures

Broad concern	Name of fact/conjecture	Statement	Status
Infinitude	twin primes conjecture	there are infinitely many twin primes	open
Largeness, i.e., sum of reciprocals	Brun's theorem	the sum of reciprocals of all twin prime pairs (i.e., we add the reciprocal of each member of each twin prime pair) is finite	proved. This sum is Brun's constant.
Density	first Hardy-Littlewood conjecture	In the particular case of twin primes, the claim is that the number of twin prime pairs ${\displaystyle \leq n}$ is ${\displaystyle \!\sim 2C_{2}n/(\ln n)^{2}}$, where ${\displaystyle C_{2}}$ is a specified constant.