On some algebraic and geometric extensions of Goldbach's conjecture
Abstract
The goal of this paper is to study Goldbach's conjecture for rings of regular functions of affine algebraic varieties over a field. Among our main results, we define the notion of Goldbach condition for Newton polytopes, and we prove in a constructive way that any polynomial in at least two variables over a field can be expressed as sum of at most 2r absolutely irreducible polynomials, where r is the number of its non--zero monomials. We also study other weak forms of Goldbach's conjecture for localizations of these rings. Moreover, we prove the validity of Goldbach's conjecture for a particular instance of the so--called forcing algebras introduced by Hochster. Finally, we prove that, for a proper multiplicative closed set S of Z, the collection of elements of S-1Z that can be written as finite sum of primes forms a dense subset of the real numbers, among other results.
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