Transcendence degree

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English

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Noun

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Template:Lb Given a field extension L / K, the largest cardinality of an algebraically independent subset of L over K.
- 2004, F. Hess, An Algorithm for Computing Isomorphisms of Algebraic Function Fields, Duncan Buell (editor), Algorithmic Number Theory: 6th International Symposium, ANTS-VI, Template:W 3076, page 263,
  Let $F_{1} / k$ and $F_{2} / k$ denote algebraic function fields of transcendence degree one.
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Usage notes

A transcendence degree is said to be of a field extension (i.e., $L / K$ ). More properly, it is the cardinality of a particular type of subset of the extension field $L$ , although the context of the field extension is required to make sense of the definition.
Relatedly, a Template:M of L/K is a subset of L that is algebraically independent over K and such that L is an algebraic extension of K(S) (that is, L/K(S) is an algebraic extension).
- It can be shown that every field extension $L / K$ has a transcendence basis, whose cardinality, denoted ${trdeg}_{K} L$ or $trdeg (L / K)$ , is exactly the transcendence degree of $L / K$ .

Synonyms

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See also

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Further reading

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