The solution of such differential equation is called time ordered exponential: x(t) = \mathrm{Texp} \left ( \int_0^t A(s) ds \right ) x(0). The definition of the \mathrm{Texp} can be found ...

Yes, your construction works. To see this, first observe that T is an isometry: If f=\sum_{g\in G} a_gg, finitely supported, we get ||f+N||_{\varphi}^2=\langle f+N,f+N\rangle_{GNS}=\varphi(f^*f)=\sum_{g,s\in \Gamma}a_g\overline{a_s}\varphi(g^{-1}s)=\langle \hat{f},\hat{f}\rangle_{\varphi}=||\hat{f}||^2 ...

Actually it suffices when the canonical maps j_X:X\times\{0\}\hookrightarrow M_i and \bar i:A\times I\to M_i extend to a map r:X\times I\to M_i with r(i(a),t)=(a,t) and r(x,0)=x. Because ...

It needs to be parametrized by arc length: \begin{align*} ds &= r\sqrt{a^2\sin^2 t+b^2\cos^2 t} \, dt \\ S_\text{total} &= r\int_{0}^{2\pi} \sqrt{a^2\sin^2 t+b^2\cos^2 t} \, dt \\ &= 4raE\left( ...

Seems good to me. There is only one thing I want to point out (but perhaps you know this): you only proved that \Psi in surjective with this. However, since \mathcal{L}(V,W) and M_{m \times n}(F) ...

Theres no derivation of the comoving coordinate, but theres a definition where you can define it is as, r=a(t_0)R or in words the comoving distance is the proper distance where scale factor to ...