Algebraic extension

In mathematics, an algebraic extension is a field extension $L / K$ such that every element of the larger field $L$ is algebraic over the smaller field $K$ ; that is, every element of $L$ is a root of a non-zero polynomial with coefficients in $K$ .^[1]^[2] A field extension that is not algebraic, is said to be transcendental, and must contain transcendental elements, that is, elements that are not algebraic.^[3]^[4]

The algebraic extensions of the field $\mathbb {Q}$ of the rational numbers are called algebraic number fields and are the main objects of study of algebraic number theory. Another example of a common algebraic extension is the extension $\mathbb {C} /\mathbb {R}$ of the real numbers by the complex numbers.

^ Fraleigh (2014), Definition 31.1, p. 283.
^ Malik, Mordeson, Sen (1997), Definition 21.1.23, p. 453.
^ Fraleigh (2014), Definition 29.6, p. 267.
^ Malik, Mordeson, Sen (1997), Theorem 21.1.8, p. 447.

[1] Fraleigh (2014), Definition 31.1, p. 283.

[2] Malik, Mordeson, Sen (1997), Definition 21.1.23, p. 453.

[3] Fraleigh (2014), Definition 29.6, p. 267.

[4] Malik, Mordeson, Sen (1997), Theorem 21.1.8, p. 447.

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