Chen prime


A prime number p is called a Chen prime if p + 2 is either a prime or a product of two primes. The even number 2p + 2 therefore satisfies Chen's theorem.
The Chen primes are named after Chen Jingrun, who proved in 1966 that there are infinitely many such primes. This result would also follow from the truth of the twin prime conjecture as the lower member of a pair of twin primes is by definition a Chen prime.
The first few Chen primes are
The first few Chen primes that are not the lower member of a pair of twin primes are
The first few non-Chen primes are
All of the supersingular primes are Chen primes.
Rudolf Ondrejka discovered the following 3x3 magic square of nine Chen primes:
2996863034895 × 21290000 − 1, with 388342 decimal digits, is the largest known Chen prime.
The sum of the reciprocals of Chen primes converges.

Further results

Chen also proved the following generalization: For any even integer h, there exist infinitely many primes p such that p + h is either a prime or a semiprime.
Green and Tao showed that the Chen primes contain infinitely many arithmetic progressions of length 3. Binbin Zhou generalised this result by showing that the Chen primes contain arbitrarily long arithmetic progressions.