Normal Bases and Their Dual–Bases over Finite Fields

We continue the work of the previous paper (Hachenberger, Finite Fields Appl., in press), and, generalizing some of the results obtained there, we give explicit constructions of free and completely free elements in GF(q r n ) over GF(q), where n is any nonnegative integer and where r is any odd prim

## Let % O L denote the "nite "eld with qL elements, for q a prime power. % O L may be regarded as an n-dimensional vector space over % O . 3% O L generates a normal basis for this vector space (% O L :% O ), if + , O, q , 2 , O L\ , are linearly independent over % O . Let N O (n) denote the numbe

A characterization of normal bases and complete normal bases in GF(q r n ) over GF(q), where q Ͼ 1 is any prime power, r is any prime number different from the characteristic of GF(q), and n Ն 1 is any integer, leads to a general construction scheme of series (v n ) nՆ0 in GF(q r ȍ ) :ϭ ʜ nՆ0 GF(q r