On common index divisors and monogenity of of the nonic number field defined by a trinomial x9+ax+b
Abstract
Let K be a nonic number field generated by a complex root of a monic irreducible trinomial F(x)= x9+ax+b ∈ [x], where ab ≠ 0. Let i(K) be the index of K. A rational prime p dividing i(K) is called a prime common index divisor of K. In this paper, for every rational prime p, we give necessary and sufficient conditions depending only a and b for which p is a common index divisor of K. As application of our results we identify infinite parametric families of non-monogenic nonic numbers fields defined by such trinomials. At the end, some numerical examples illustrating our theoretical results are given.
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