On a diophantine inequality with prime numbers of a special type

Abstract

We consider the Diophantine inequality \[ | p1c + p2c + p3c- N | < ( N)-E , \] where 1 < c < 1514, N is a sufficiently large real number and E>0 is an arbitrarily large constant. We prove that the above inequality has a solution in primes p1, p2, p3 such that each of the numbers p1 + 2, p2 + 2, p3 + 2 has at most [ 369180 - 168 c ] prime factors, counted with the multiplicity.