EISENSTEIN PRIME

In mathematics, an 'Eisenstein prime' is an Eisenstein integer
:''a''ω + ''b''
that is irreducible (or equivalently prime) in the ring-theoretic sense: its only Eisenstein divisors are the units 1, 1+ω, ω, -1, -1-ω, -ω, and ''a''ω + ''b'' itself and its unit multiples. Here ω is the complex cube root of unity
:
The Eisenstein primes are precisely those Eisenstein integers α which fulfil one of the following conditions:
#α is equal to the product of a unit and 1 - ω,
#α is equal to the product of a unit and a natural prime 3''n'' - 1,
#α can be multiplied by an Eisenstein integer such that the product is a natural prime 3''n'' + 1.
The first few Eisenstein primes that equal a natural prime 3''n'' - 1 are:
2, 5, 11, 17, 23, 29, 41, 47, 53, 59, 71, 83, 89, 101
which are listed in . Some non-real Eisenstein primes are
2 + ω, 3 + ω, 4 + ω, 5 + 2ω, 6 + ω, 7 + ω, 7 + 3ω
The complex conjugate of any Eisenstein prime is another; multiplying an Eisenstein prime by any of the units 1, 1+ω, ω, -1, -1-ω, -ω also gives an Eisenstein prime. Up to conjugacy and unit multiples, the primes listed above, together with 2 and 5, are all the Eisenstein primes of absolute value not exceeding 7.
Eisenstein primes are named after the mathematician Ferdinand Eisenstein.
As of 2007, the largest known (real) Eisenstein prime is 27653·2^9167433 + 1, which is the seventh largest known prime, discovered by Gordon [1]. All larger known primes are Mersenne primes, discovered by GIMPS. Real Eisenstein primes are congruent to 2 mod 3, and Mersenne primes (except the smallest, 3) are congruent to 1 mod 3.