I like to visualize lie groups as flows on some manifold.
For example:
$SO(2)$ can be visualized as rotations of $S^1$ and it's lie algebra as constant vector fields on $S^1$.
Or $SO(1,1)$ can be visualized as flows on hyperbola $\{ (x,y) : x^2-y^2 = 1 \}$.
In general I visualize Lie group as subgroup of diffeomorphisms of some manifold and elements of lie algebra as vector field on this manifold
From these visualizations one can see that $SO(2)$ is connected and its exponential mapping is onto but one-to-one. And that $O(2)$ has two components. Or that $O(1,1)$ has four components.
So I would like to know if I can visualize other groups like Heisenberg group, symplectic group?
Is there a way how can I see that Lie group is simply connected?