In mathematics, a linearised polynomial is a polynomial over a finite field of order q for which the exponents of all the consituent monomials are powers of q.
We write a typical example as
Properties
- The map x → L(x) is a linear map on any field containing Fq
- The set of roots of L is an Fq-vector space and is closed under the q-Frobenius map
- Conversely, if U is any Fq-linear subspace of some finite field containing Fq, then the polynomial that vanishes exactly on U is a linearised polynomial.
- The set of linearised polynomials over a given field is closed under addition and composition of polynomials.
Associated polynomials
The polynomials L and
are associates.
References
- Lidl, Rudolf; Niederreiter, Harald (1997). Finite fields. Encyclopedia of Mathematics and Its Applications. Vol. 20 (2nd ed.). Cambridge University Press. ISBN 0-521-39231-4. Zbl 0866.11069.
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