On a Diophantine Inequality with Prime Numbers of a Special Type

We consider the Diophantine inequality |p (1) (c) + p (2) (c) + p (3) (c) - N| < (logN)(-E) , where 1 < c < 15/14, 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 p (1), p (2), p (3) such that each of the numbers p (1) + 2, p (2) + 2 and p (3) + 2 has at most [369/(180 - 168c)] prime factors, counted with multiplicity.