The Irreducibility and Monogenicity of Power-Compositional Trinomials

Abstract

A polynomial f(x)∈ Z[x] of degree N is called monogenic if f(x) is irreducible over Q and \1,θ,θ2,… ,θN-1\ is a basis for the ring of integers of Q(θ), where f(θ)=0. Define F(x):=xm+Axm-1+B. In this article, we determine sets of conditions on m, A, and B, such that the power-compositional trinomial F(xpn) is monogenic for all integers n 0 and a given prime p. Furthermore, we prove the actual existence of infinite families of such trinomials F(x).