= Diagonalizable group
{wiki=Diagonalizable_group}
A group is said to be diagonalizable if it can be represented in a certain way with respect to its action on a vector space, particularly in the context of linear algebra. More specifically, in the context of linear representations, a group is diagonalizable when its representation can be expressed in a diagonal form. In this context, consider a group \\( G \\) acting on a vector space \\( V \\) over some field, typically the complex numbers.
Back to article page