Universal Inclusion of Prescribed Primes in 3x3 Magic Squares

Abstract

We present an integrated version of the global program proving that every prescribed prime \(q0 5\) occurs in some \(3× 3\) magic square whose nine entries are distinct positive primes. The manuscript explicitly corrects the four points that had prevented the previous version from being regarded as closed: (i) the notation for the fixed prime \(q0\) is now kept uniformly distinct from the notation for the sieve moduli \(d\); (ii) the weight convention is unified by working with the function \((n)= n\) on the primes and \(0\) off the primes, while \(\) is used only inside the analytic estimates where it is the natural variable; (iii) the full residual notation \((W,aW,bW,S1,Ad,g(d))\) has been incorporated throughout the manuscript; and (iv) the final closure is replaced by a residual-completion theorem on the common support of the core, thereby eliminating the logical gap produced by intersecting two independent theorems.