Revision 024c9750ac3f39428818576cba043d57e6a7f2c1 authored by Mohamed Barakat on 09 July 2015, 13:37:30 UTC, committed by Mohamed Barakat on 09 July 2015, 16:29:51 UTC
1 parent cea8169
AffineVarieties.xml
<?xml version="1.0" encoding="UTF-8"?>
<!--
Varieties.xml ToricVarieties
Copyright (C) 2011-2012, Sebastian Gutsche, RWTH Aachen University
-->
<Chapter Label="AffineVariety">
<Heading>Affine toric varieties</Heading>
<Section Label="AffineVariety:Category">
<Heading>Affine toric varieties: Category and Representations</Heading>
<#Include Label="IsAffineToricVariety">
</Section>
<Section Label="AffineVariety:Properties">
<Heading>Affine toric varieties: Properties</Heading>
Affine toric varieties have no additional properties. Remember that affine toric varieties are toric varieties,
so every property of a toric variety is a property of an affine toric variety.
</Section>
<Section Label="AffineVariety:Attributes">
<Heading>Affine toric varieties: Attributes</Heading>
<#Include Label="CoordinateRing">
<#Include Label="ListOfVariablesOfCoordinateRing">
<#Include Label="MorphismFromCoordinateRingToCoordinateRingOfTorus">
<#Include Label="ConeOfVariety">
</Section>
<Section Label="AffineVariety:Methods">
<Heading>Affine toric varieties: Methods</Heading>
<#Include Label="CoordinateRing2">
<#Include Label="ConeMethod">
</Section>
<Section Label="AffineVariety:Constructors">
<Heading>Affine toric varieties: Constructors</Heading>
The constructors are the same as for toric varieties. Calling them with a cone will
result in an affine variety.
</Section>
<Section Label="AffineVariety:Examples">
<Heading>Affine toric Varieties: Examples</Heading>
<#Include Label="AffineSpaceExample">
</Section>
<!-- ############################################################ -->
</Chapter>
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