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Galois Field Terminology
The discussion of Galois fields in this document uses a few terms that are not used consistently in the literature. The definitions adopted here appear in van Lint [4].
- A primitive element of GF(2m) is a cyclic generator of the group of nonzero elements of GF(2m). This means that every nonzero element of the field can be expressed as the primitive element raised to some integer power.
- A primitive polynomial for GF(2m) is the minimal polynomial of some primitive element of GF(2m). That is, it is the binary-coefficient polynomial of smallest nonzero degree having a certain primitive element as a root in GF(2m). As a consequence, a primitive polynomial has degree m and is irreducible.
The definitions imply that a primitive element is a root of a corresponding primitive polynomial.
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