Translates of completely normal elements and the Morgan-Mullen conjecture
Abstract
Denote by Fq the finite field of order q and by Fqn its extension of degree n. Some a∈ Fqn is called primitive if it generates the multiplicative group Fqn* and it is called qn/q-normal if its Fq-conjugates form an Fq-basis of Fqn if the latter is viewed as an Fq-vector space. Furthermore, some a∈ Fqn is called qn/q-completely normal if it is qn/qd-normal for all d n. In this work we prove a new construction of sets of completely normal elements and, we establish, under conditions, the existence of elements that are simultaneously primitive and qn/q-completely normal, covering some yet unresolved cases of a 30-year-old conjecture by Morgan and Mullen.
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