On index divisors and monogenity of certain number fields defined by x12+axm+b
Abstract
In this paper, we deal with the problem of monogenity of number fields defined by monic irreducible trinomials F(x)=x12+axm+b∈ Z[x] with 1≤ m≤11. We give sufficient conditions on a, b, and m so that the number field K is not monogenic. In particular, for m=1 and for every rational prime p, we characterize when p divides the index of K and we provide a partial answer to the Problem 22 of Narkiewicz Nar for these number fields. Our results are illustrated by computational examples.
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