On the Irreducibility of the Cuboid Polynomial Pa,u(t)

Abstract

In this paper we consider the even monic degree-8 cuboid polynomial Pa,u(t) with coprime integers a≠ u>0. We prove irreducibility over Z by excluding all degree-8 splittings. First, any putative 4+4 factorization is shown to force a specific Diophantine constraint that has no integer solutions, via a short 2- and 3-adic analysis. Second, we exclude every 2+6 factorization using an exact divisor criterion together with a discriminant obstruction. Finally, after ruling out 2+6, the patterns 2+2+4, 2+2+2+2, and 3+3+2 regroup trivially to 2+6 and are therefore impossible. Consequently, Pa,u(t) admits no nontrivial factorization in Z[t].

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