Is $\Vert x \Vert_{H^m(\Omega)} = 1$ (Sobolev-norms) always a unit ball if you plot/visualise it it?

Question

We know that for $L^p$ norms one gets a fascinating visual display of the norms as included. Do the Sobolev norms follow the same or a similar pattern or are they always unit balls? If they are always unit balls, are for example, $H^2(\Omega)$ norm balls smaller than those in $H^1(\Omega)$ because of the compact embedding theorem? Thank you very much for your time.