Radical of an algebraic group: Difference between revisions

The radical of an algebraic group is the identity component of its maximal normal solvable subgroup. For example, the radical of the general linear group ${\displaystyle {\mathrm{GL}}_n(K)}$ (for a field K) is the subgroup consisting of scalar matrices, i.e. matrices ${\displaystyle (a_{ij})}$ with ${\displaystyle a_{11}=\dots =a_{nn}}$ and ${\displaystyle a_{ij}=0}$ for ${\displaystyle i\ne j}$.

An algebraic group is called semisimple if its radical is trivial, i.e., consists of the identity element only. The group ${\displaystyle {\mathrm{SL}}_n(K)}$ is semi-simple, for example.

The subgroup of unipotent elements in the radical is called the unipotent radical, it serves to define reductive groups.

• Reductive group
• Unipotent group

• "Radical of a group", Encyclopaedia of Mathematics

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