Let G and H be affine algebraic groups over a scheme S of characteristic 0 and let ![\textbf{Hom}_{S,gp}(G,H)](http://latex.mathoverflow.net/png?%5Ctextbf%7BHom%7D%5F%7BS%2Cgp%7D%28G%2CH%29) be the functor ![T \mapsto \text{Hom}_{T,gp}(G,H)](http://latex.mathoverflow.net/png?T%20%5Cmapsto%20%5Ctext%7BHom%7D%5F%7BT%2Cgp%7D%28G%2CH%29)


> **Theorem** (SGA 3, expose XXIV, 7.3.1(a)): Suppose G is reductive. Then 
![\textbf{Hom}_{S,gp}(G,H)](http://latex.mathoverflow.net/png?%5Ctextbf%7BHom%7D%5F%7BS%2Cgp%7D%28G%2CH%29) is representable by a scheme.

Can this fail if G is not reductive? I worked out a few example with G = ![\mathbb{G}_a](http://latex.mathoverflow.net/png?%5Cmathbb%7BG%7D%5Fa), but they were representable.