What does it mean when we say a topological group $\Gamma$ has linear type?
Is it an algebraic property or a topology property?
I wonder if anyone could give some references.
What does it mean when we say a topological group $\Gamma$ has linear type?
Is it an algebraic property or a topology property?
I wonder if anyone could give some references.
Another answer: I found in Annals of Mathematics, vol. 40, no. 3, July, 1939 that:
An "Abelian, convex, connected, and sequentially complete Hausdorff group such that it possesses no elements of finite order may be called a linear topological group.
This might not be the right answer, but maybe it is helpful.
An algebraic group is an algebraic variety $G$ together two maps $\begin{align} &\mu: G \times G \to G & &(x,y) \mapsto xy\\ &i: G \to G & &x \mapsto x^{-1} \end{align} $ which are both morphisms of varieties.
Now if the varieties are affine, then we say that $G$ is a linear algebraic group.
Now this might not be what you are studying. Even thougth there is an underlying topology (the Zariski topology) on $G$, it doesn't mean that the group is a topological group.