Finite algebra - Misplaced Pages

This article may be too technical for most readers to understand. Please help improve it to make it understandable to non-experts, without removing the technical details. (January 2020) (Learn how and when to remove this message)

In abstract algebra, an associative algebra $A$ over a ring $R$ is called finite if it is finitely generated as an $R$ -module. An $R$ -algebra can be thought as a homomorphism of rings $f\colon R\to A$ , in this case $f$ is called a finite morphism if $A$ is a finite $R$ -algebra.

Being a finite algebra is a stronger condition than being an algebra of finite type.

Finite morphisms in algebraic geometry

This concept is closely related to that of finite morphism in algebraic geometry; in the simplest case of affine varieties, given two affine varieties $V\subseteq \mathbb {A} ^{n}$ , $W\subseteq \mathbb {A} ^{m}$ and a dominant regular map $\phi \colon V\to W$ , the induced homomorphism of $\Bbbk$ -algebras $\phi ^{*}\colon \Gamma (W)\to \Gamma (V)$ defined by $\phi ^{*}f=f\circ \phi$ turns $\Gamma (V)$ into a $\Gamma (W)$ -algebra: