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FiniteFieldEmbedding

FiniteFieldEmbedding

FiniteFieldEmbedding[ff₁,ff₂]

gives an embedding of the finite field ff₁ in the finite field ff₂.

FiniteFieldEmbedding[e₁e₂]

represents the embedding of the ambient field of e₁ in the ambient field of e₂, which maps e₁ to e₂.

Details

Finite field embeddings are also known as Galois field embeddings or finite field monomorphisms.
Finite field embeddings are typically used to identify one finite field with a subfield of another.
If ℰ=FiniteFieldEmbedding[e₁e₂], where e₁∈ff₁ and e₂∈ff₂, then maps ff₁ into ff₂, , and for all .
A finite field ff₁ can be embedded in ff₂ if it has the same characteristic as ff₂ and its extension degree divides that of ff₂.
Finite field elements e₁∈ff₁ and e₂∈ff₂ define a field embedding of ff₁ in ff₂ iff they have the same MinimalPolynomial and e₁ generates ff₁. The latter condition is satisfied iff the degree of the minimal polynomial of e₁ is equal to the extension degree of ff₁ over .
For an embedding ℰ=FiniteFieldEmbedding[e₁e₂], ℰ["Projection"] represents a linear mapping from the ambient field ff₂ of e₂ onto the ambient field ff₁ of e₁, treated as vector spaces over , such that for all .

Examples

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Basic Examples (1)

Represent finite fields and with characteristic and extension degrees and :

Find an embedding of in :

Map an element of through the embedding:

Project the result back to :

Scope (3)

Represent finite fields and with characteristic and extension degrees and :

Find an embedding of in :

A field embedding preserves addition and multiplication:

ℰ["Projection"] is a -linear mapping but does not preserve multiplication:

The composition of ℰ["Projection"] with is the identity on :

The reverse composition is not the identity on :

Specify a field embedding by manually picking a generator and its value:

a generates if the degree of its minimal polynomial equals the extension degree of :

Find the roots of f in :

Pick one of the roots:

Represent the embedding of in that maps a to b:

For the embedding to exist, both fields need to have the same characteristic:

The extension degree of the first field needs to divide the extension degree of the second field:

Applications (1)

Factor a polynomial in an algebraic extension of a finite field:

Embed in a finite field with elements:

Map f through the embedding:

Factor the result:

Use the Extension option to combine the last two steps:

Properties & Relations (4)

A field embedding preserves addition and multiplication:

ℰ["Projection"] is a -linear mapping but does not preserve multiplication:

The composition of ℰ["Projection"] with is the identity on :

The reverse composition is not the identity on :

Find an automorphism of :

All finite field automorphisms are functional powers of the Frobenius automorphism:

Here aut[a]==FrobeniusAutomorphism[a,4]:

An embedding allows identifying with a subfield of :

Use FiniteFieldElementTrace to compute :

Use FiniteFieldElementNorm to compute :

Use MinimalPolynomial to find the minimal polynomial of an element of over :

Use Composition to compose finite field embeddings:

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