If $G$ is a reductive group over a field $k$, why is the radical of $G$ equal to the connected component of the center? Borel's book (Linear Algebraic Groups) has a proof if $k$ is algebraically closed -- one can characterize the center of $G$ as the intersection of the Borels. But I don't know if that generalizes in some way over an arbitary field.
Why is the radical of a reductive group equal to the connected component of the center?
Not a grad student
- 913
- 4
- 12