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Let E = F(e_1,e_2,...,e_t) be a field extension.  Any element e in E for which F(e) = F(e_1,...,e_t) is a '''primitive element''' of E over F.
 
Let E = F(e_1,e_2,...,e_t) be a field extension.  Any element e in E for which F(e) = F(e_1,...,e_t) is a '''primitive element''' of E over F.
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An extension E/F is '''normal''' if E is the splitting field of some polynomial in F[x].
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An extension is '''Galois''' if it's normal and the polynomial was separable (no repeated roots).

Revision as of 19:22, 29 April 2009


Euclid a = qb + r with 0 <= r < b where a,b,q,r are integers

--ERaymond 12:26 29 January 2009 (UTC)

GCD: The greatest common divisor of two nonzero integers a and b is the largest of all common divisors of a and b.

LCM: The least common multiple of two nonzero integers a and b is the smallest positive integer that is a multiple of both a and b.

--Jmcdorma 12:16, 5 February 2009 (UTC)

Monomorphism: morphism for which phi(g) = phi(g') happens only if g = g'. (injective)

Epimorphism: morphism for which every element in target group H is hit. (surjective)

Isomorphism: morphism that is both injective and surjective.

The kernel of a morphism is the collection of elements in G that satisfy phi(g) = 1_H

An inner automorphism, Inn(G), is always attached to some group element written ϕ_{a} for the following morphism from G to itself: ϕ_{a}(g)=aga⁻¹


If m and n are coprime, then Z_mn is isomorphic to Z_m x Z_n

The stabilizer of a point P is the set of elements in a group G of permutations that keep P in the same place; it is a subgroup of G.

The orbit of a point P is the set of all points to which P can be moved using an element of a group G of permutations.


Let E = F(e_1,e_2,...,e_t) be a field extension. Any element e in E for which F(e) = F(e_1,...,e_t) is a primitive element of E over F.


An extension E/F is normal if E is the splitting field of some polynomial in F[x]. An extension is Galois if it's normal and the polynomial was separable (no repeated roots).

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Basic linear algebra uncovers and clarifies very important geometry and algebra.

Dr. Paul Garrett