Goldbach's like conjectures arising from arithmetic progressions whose first two terms are primes

Abstract

For two odd primes p and q such that p<q, let A(p,q):=(ak)k=1∞ be the arithmetic progression whose kth term is given by ak=(k-1)(q-p)+p (i.e., with a1=p and a2=q). Here we conjecture that for every positive integer a>1 there exist a positive integer n and two odd primes p and q such that a can be expressed as a sum of the first 2n terms of the arithmetic progression A(p,q). Notice that in the case of even a, this conjecture immediately follows from Goldbach's conjecture. We also propose the analogous conjecture for odd positive integers a>1 as well as some related Goldbach's like conjectures arising from the previously mentioned arithmetic progressions.