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Algebraic independence

From Wikipedia, the free encyclopedia

In abstract algebra, a subset S of a field L is algebraically independent over a subfield K if the elements of S do not satisfy any non-trivial polynomial equation with coefficients in K. This means that for every finite sequence α1, ..., αn of elements of S, no two the same, and every non-zero polynomial P(x1, ..., xn) with coefficients in K, we have

P1,...,αn) ≠ 0.

In particular, a one element set {α} is algebraically independent over K if and only if α is transcendental over K. In general, all the elements of an algebraically independent set over K are by necessity transcendental over K, but that is far from being a sufficient condition.

For example, the subset {√π, 2π+1} of the real numbers R is not algebraically independent over the rationals Q, since the non-zero polynomial

P(x_1,x_2)=2x^2_1-x_2+1

yields zero when √π is substituted for x1 and 2π+1 is substituted for x2.

The Lindemann-Weierstrass theorem can often be used to prove that some sets are algebraically independent over Q. It states that whenever α1,...,αn are algebraic numbers that are linearly independent over Q, then eα1,...,eαn are algebraically independent over Q.

It is not known whether the set {π, e} is algebraically independent over Q. Nesterenko proved in 1996 that {π, eπ, Γ(1/4)} is algebraically independent over Q.

Given a field extension L/K, we can use Zorn's lemma to show that there always exists a maximal algebraically independent subset of L over K. Further, all the maximal algebraically independent subsets have the same cardinality, known as the transcendence degree of the extension.

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