Constrained Hamiltonian dynamics of 3D gravity-coupled topological matter

Abstract: We analyze the dynamics of two one-form topological matter fields minimally coupled to first-order gravity in three-dimensional spacetime using the Dirac Hamiltonian formalism. Working in the full phase space, we systematically identify the complete set of constraints of the system, classify them into first- and second-class, and compute their Poisson bracket algebra. The constraint analysis confirms the absence of physical degrees of freedom, consistent with the system's topological character. Furthermore, we construct the generating functional for gauge transformations and demonstrate that, with appropriate gauge parameter mappings, these transformations recover the full diffeomorphism and Poincar\'e symmetries of the theory. Finally, we explicitly compute the Dirac brackets, establishing the symplectic structure of the reduced phase space.