Monogenic field: Difference between revisions

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==Examples==
==Examples==
Examples of monogenic fields include:
Examples of monogenic fields include:
* [[Quadratic fields]]: if <math>K = \mathbf{Q}(\sqrt d)</math> with <math>d</math> a [[square-free]] integer then <math>O_K = \mathbf{Z}[a]</math> where <math>a = (1+\sqrt d)/2</math> if ''d''≡1 (mod 4) and <math>a = \sqrt d</math> if ''d''≡2 or 3 (mod 4).
* [[Quadratic field]]s: if <math>K = \mathbf{Q}(\sqrt d)</math> with <math>d</math> a [[square-free integer]] then <math>O_K = \mathbf{Z}[a]</math> where <math>a = (1+\sqrt d)/2</math> if ''d''≡1 (mod 4) and <math>a = \sqrt d</math> if ''d''≡2 or 3 (mod 4).
* [[Cyclotomic fields]]: if <math>K = \mathbf{Q}(\zeta)</math> with <math>\zeta</math> a root of unity, then <math>O_K = \mathbf{Z}[\zeta]</math>.
* [[Cyclotomic field]]s: if <math>K = \mathbf{Q}(\zeta)</math> with <math>\zeta</math> a root of unity, then <math>O_K = \mathbf{Z}[\zeta]</math>.


Not all number fields are monogenic: Dirichlet gave the example of the [[cubic field]] generated by a root of the polynomial <math>X^3 - X^2 - 2X - 8</math>.
Not all number fields are monogenic: Dirichlet gave the example of the [[cubic field]] generated by a root of the polynomial <math>X^3 - X^2 - 2X - 8</math>.

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In mathematics, a monogenic field is an algebraic number field for which there exists an element a such that the ring of integers OK is a polynomial ring Z[a]. The powers of such a element a constitute a power integral basis.

In a monogenic field K, the field discriminant of K is equal to the discriminant of the minimal polynomial of α.

Examples

Examples of monogenic fields include:

  • Quadratic fields: if with a square-free integer then where if d≡1 (mod 4) and if d≡2 or 3 (mod 4).
  • Cyclotomic fields: if with a root of unity, then .

Not all number fields are monogenic: Dirichlet gave the example of the cubic field generated by a root of the polynomial .

References