If I understand correctly, Dijkgraaf-Witten TQFT in dimension 2 is the following. Fix any finite group $G$, we define a field over a closed 2-manifold to be a principle $G$ bundle (it's automatically flat since $G$ has trivial Lie algebra). Fixing an action functional, we get a number assigned to the closed 2-fold. In this question, I will not alter the action functional.
To go to codimension 1, we assign the circle the space of functions over the space of fields, i.e.
$$Z_G(S^1) = \mbox{Function}(\{G\mbox{-bundles over circle}\}),\mathbb{C})$$
So any 2-fold with boundary being a circle is just a function in $Z_G(S^1)$ in the natural way. So far, it gives a $(2,1)$ TQFT, and it is natural to me.
And then we attempt to go to codimension 2 (i.e. dimension 0). By assigning the category of representations of $G$ to the positively oriented point $pt_+$, one can prove that we get a $(2,1,0)$ TQFT. I know how to verify this. However, this construction does not seem natural to me. Thus I'd like to ask:
Question
- Is this extension from $(2,1)$ to $(2,1,0)$ unique? Namely, is this the only way that extends the already defined $(2,1)$ theory?
If so, how would one argue? And also if this is the case, how can one go to higher codimension, if we have started from dimension 3 or higher?
Can one canonically get a fully extended $n$-TQFT from this procedure?
