Is there is a functor of points approach to tensor triangulated categories parallel to Balmer's theory of prime ideal spectra?

Given a tensor triangulated category $\mathcal{T}$ an $R$-point can be possibly thought about as a tensor triangulated functor $\mathcal{T} \to D^b(R)$.

What can be said about the faithfulness of the functor $$\otimes\Delta Cat \to PSh_{Sets}(CRings)$$ sending a $\mathcal{T}$ to its $R$-points.