Field extension/Related Articles: Difference between revisions
Jump to navigation
Jump to search
imported>Daniel Mietchen m (Robot: encapsulating subpages template in noinclude tag) |
imported>Housekeeping Bot m (Automated edit: Adding CZ:Workgroups to Category:Bot-created Related Articles subpages) |
||
Line 32: | Line 32: | ||
{{r|Splitting field}} | {{r|Splitting field}} | ||
{{Bot-created_related_article_subpage}} | |||
<!-- Remove the section above after copying links to the other sections. --> | <!-- Remove the section above after copying links to the other sections. --> |
Revision as of 15:32, 11 January 2010
- See also changes related to Field extension, or pages that link to Field extension or to this page or whose text contains "Field extension".
Parent topics
Subtopics
Bot-suggested topics
Auto-populated based on Special:WhatLinksHere/Field extension. Needs checking by a human.
- Algebraic number field [r]: A field extension of the rational numbers of finite degree; a principal object of study in algebraic number theory. [e]
- Artin-Schreier polynomial [r]: A type of polynomial whose roots generate extensions of degree p in characteristic p. [e]
- Complex number [r]: Numbers of the form a+bi, where a and b are real numbers and i denotes a number satisfying . [e]
- Conductor of a number field [r]: Used in algebraic number theory; a modulus which determines the splitting of prime ideals. [e]
- Cyclotomic field [r]: An algebraic number field generated over the rational numbers by roots of unity. [e]
- Discriminant of an algebraic number field [r]: An invariant attached to an extension of algebraic number fields which describes the geometric structure of the ring of integers and encodes ramification data. [e]
- Elliptic curve [r]: An algebraic curve of genus one with a group structure; a one-dimensional abelian variety. [e]
- Field (mathematics) [r]: An algebraic structure with operations generalising the familiar concepts of real number arithmetic. [e]
- Field automorphism [r]: An invertible function from a field onto itself which respects the field operations of addition and multiplication. [e]
- Field theory (mathematics) [r]: A subdiscipline of abstract algebra that studies fields, which are mathematical constructs that generalize on the familiar concepts of real number arithmetic. [e]
- Galois theory [r]: Algebra concerned with the relation between solutions of a polynomial equation and the fields containing those solutions. [e]
- Matroid [r]: Structure that captures the essence of a notion of 'independence' that generalizes linear independence in vector spaces. [e]
- Minimal polynomial [r]: The monic polynomial of least degree which a square matrix or endomorphism satisfies. [e]
- Normal extension [r]: A field extension which contains all the roots of an irreducible polynomial if it contains one such root. [e]
- Quadratic equation [r]: An equation of the form ax2 + bx + c = 0 where a, b and c are constants. [e]
- Quadratic field [r]: A field which is an extension of its prime field of degree two. [e]
- Splitting field [r]: A field extension generated by the roots of a polynomial. [e]