Abelian variety/Related Articles: Difference between revisions

Latest revision as of 13:54, 5 July 2024

Algebraic geometry [r]: Discipline of mathematics that studies the geometric properties of the objects defined by algebraic equations. ^[e]
Algebraic group [r]: An algebraic variety with a group structure given by rational maps. ^[e]

Elliptic curve [r]: An algebraic curve of genus one with a group structure; a one-dimensional abelian variety. ^[e]

Isogeny [r]: Morphism of varieties between two abelian varieties (e.g. elliptic curves) that is surjective and has a finite kernel. ^[e]
Abelian surface [r]: A 2-dimensional Abelian variety. ^[e]
Module [r]: Mathematical structure of which abelian groups and vector spaces are particular types. ^[e]
Tania function [r]: The mathematical function that is the particular solution f=f(z) in the complex z-plane of the equation df/dz=f/(1+f) that satisfies the condition f(0)=1. ^[e]
Tetration [r]: Holomorphic function characterized in that at integer values of its argument it can be interpreted as iterated exponent. ^[e]
Van der Waals equation [r]: An equation of state for a fluid composed of particles that have a non-zero size and a pairwise attractive inter-particle force. ^[e]

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 ==Other related topics==
 <!-- List topics here that are related to this topic, but neither wholly include it nor are wholly included by it. -->
+==Articles related by keyphrases (Bot populated)==
+{{r|Isogeny}}
+{{r|Abelian surface}}
+{{r|Module}}
+{{r|Tania function}}
+{{r|Tetration}}
+{{r|Van der Waals equation}}