On linear equations with prime variables of special type

Let Pk denote any integer with no more than k prime factors, counted according to multiplicity. It is proved that for every sufficiently large odd integer , the equation p1+p2+p3=n is solvable in prime variables p1,p2,p3 such that p1+2=P2, , and for almost all sufficiently large even integer , the equation p1+p2=n is solvable in prime variables p1,p2 such that p1+2=P2.