Group

The article on this topic in the Group Properties Wiki can be found at: Group

Definition

A group is a set ${\displaystyle G}$ equipped with three additional operations:

• A binary operation ${\displaystyle *}$ called multiplication, or product
• A unary operation denoted as ${\displaystyle g\mapsto g^{-1}}$ called the inverse map
• A constant element denoted ${\displaystyle e}$

such that the following conditions hold:

• ${\displaystyle a*(b*c)=(a*b)*c\ \forall \ a,b,c\in G}$
• ${\displaystyle a*e=e*a=a\ \forall \ a\in G}$
• ${\displaystyle a*a^{-1}=a^{-1}*a=e\ \forall \ a\in G}$

Importance

Groups arise in differential geometry, primarily in the following contexts:

• As symmetries, or automorphisms, of geometric structures
• As structure groups of bundles
• As fundamental groups or higher (co)homotopy and (co)homology groups
• As manifolds themselves. Notions of relevance here are topological group and Lie group

External links

Definition links

• Groupprops page
• Wikipedia page
• Citizendium page