Siegel zeros and the Goldbach problem

In this paper, we are interested by the following generalization for the polynomial Goldbach problem. Let A 1 , A 2 , and A 3 be coprime polynomials in the ring F q [T]. We ask the question of the representation of a polynomial M # F q [T ] as a sum where P 1 , P 2 , P 3 are irreducible polynomials

It is conjectured that Lagrange's theorem of four squares is true for prime variables, i.e. all positive integers n with n 4 ðmod 24Þ are the sum of four squares of primes. In this paper, the size for the exceptional set in the above conjecture is reduced to OðN 3

We prove that almost all integers n ≡ 0 or 4 (mod 6) can be written in the form n = p 1 + p 2 , where The proof is an application of the half-dimensional and linear sieves with arithmetic information coming from the circle method and the Bombieri-Vinogradov prime number theorem.

Another derivation of an explicit parametrisation of Siegel's modular curve of level 5 is obtained with applications to the class number one problem.