Given a non-overlapping partition $\Omega = \overline{\Omega_1 \cup \Omega_2}$, is there any chance to obtain the following function space in FEniCS?
$$ Q := \{ v \in L^2(\Omega)~~:~~v|_T \in P_1(T)~~\forall~T~~:~~v|_{\Omega_i} \in C(\Omega_i),~~i=1,2\}$$
In other words, I want to have the piecewise $H^1$-conforming linear finite element space, but I want it to be discontinuous at the interface $\Gamma := \partial\Omega_1\cap\partial\Omega_2$.
btw, I am using the Python interface.
