An asymptotic formula for Goldbach's conjecture with monic polynomials in Z[θ][x]

Abstract

In this paper, we consider D=Z[θ], where θ= -k \,\,\,\, if\;\;\;-k 1 \;(mod\;4)\,\,\,\,or\,\,\,\, θ=-k+12 \,\,\,\, if\;\;\;-k 1 \;(mod\;4), k≥ 2 is a squarefree integer, and we proved that the number R(y) of representations of a monic polynomial f(x)∈ Z[θ][x], of degree d≥ 1, as a sum of two monic irreducible polynomials g(x) and h(x) in Z[θ][x], with the coefficients of g(x) and h(x) bounded in complex modulus by y, is asymptotic to (4y)2d-2.