On common index divisors and monogenity of certain number fields defined by trinomials of type x2r+axm+b

Abstract

Let K = () be a number with a root of an irreducible trinomial of type F(x)= x2r+axm+b ∈ [x]. In this paper, based on the p-adic Newton polygon techniques applied on decomposition of primes in number fields and the classical index theorem of Ore Narprime, O, we study the monogenity of K. More precisely, we prove that if a and 1+b are both divisible by 32, then K cannot be monogenic. For m=1, we provide explicit conditions on a, b and r for which K is not monogenic. We also construct a family of irreducible trinomials which are not monogenic, but their roots generate monogenic number fields. To illustrate our results, we give some computational examples.