The trace of 2-primitive elements of finite fields (amended version)

Abstract

Let q be a prime power and n, r integers such that r qn-1. An element of Fqn of multiplicative order (qn-1)/r is called r-primitive. For any odd prime power q, we show that there exists a 2-primitive element of Fqn with arbitrarily prescribed Fq trace when n≥ 3. Also we explicitly describe the values that the trace of such elements may have when n=2. A feature of this amended version is the reduction of the discussion to extensions of prime degree n.