File:CyclicCubicNumberFieldFundamentalDomain.svg

Summary

Description
English: A fundamental domain of the maximal order of the field K obtained by adjoining to Q a root of f(x)=x321x35. This field is a Galois extension of degree 3. Its discriminant is 3969=72×92. Accordingly, the volume of the fundamental domain is 63=7×9. The three roots of f are approximately 5.258845, -2.121082, -3.137763.
Date
Source Own work using: Mathematica.
Author RobHar
SVG development
InfoField
 The SVG code is valid.
 This diagram was created with Mathematica.
Category:Valid SVG created with Mathematica:Diagrams#CyclicCubicNumberFieldFundamentalDomain.svg
 Category:Translation possible - SVGThis diagram uses embedded text that can be easily translated using a text editor.

Licensing

Public domain I, the copyright holder of this work, release this work into the public domain. This applies worldwide.
In some countries this may not be legally possible; if so:
I grant anyone the right to use this work for any purpose, without any conditions, unless such conditions are required by law.
Category:Self-published work#CyclicCubicNumberFieldFundamentalDomain.svgCategory:PD-self#CyclicCubicNumberFieldFundamentalDomain.svg Category:SVG mathematics Category:Number theory Category:Minkowski theorem (lattices) Category:SVG polyhedra Category:Geometry SVG diagrams Category:Galois theory
Category:Galois theory Category:Geometry SVG diagrams Category:Minkowski theorem (lattices) Category:Number theory Category:PD-self Category:SVG mathematics Category:SVG polyhedra Category:Self-published work Category:Translation possible - SVG Category:Valid SVG created with Mathematica:Diagrams