Primitive element: Difference between revisions

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In field theory, a branch of mathematics, a primitive element of a finite field GF(q) is a generator of the multiplicative group of the field, which is necessarily cyclic.

Jacobson, Nathan (1985). Basic Algebra I, 2nd ed. W. H. Freeman and Co.. ISBN 978-0-7167-1480-4.
Lidl, Rudolf; Harald Niederreiter (1997). Finite Fields, 2nd ed. Cambridge University Press. ISBN 0-521-39231-4.

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	In [[field theory (mathematics)\|field theory]], a branch of [[mathematics]], a '''primitive element''' of a [[finite field]] ''GF''(''q'') is a [[generating set of a group\|generator]] of the [[group of units\|multiplicative group]] of the field, which is necessarily [[cyclic group\|cyclic]].		In [[field theory (mathematics)\|field theory]], a branch of [[mathematics]], a '''primitive element''' of a [[finite field]] ''GF''(''q'') is a [[generating set of a group\|generator]] of the [[group of units\|multiplicative group]] of the field, which is necessarily [[cyclic group\|cyclic]].