On the Coupling of Relativistic Particle to Gravity and Wheeler-DeWitt Quantization

Abstract

A system consisting of a point particle coupled to gravity is investigated. The set of constraints is derived. It was found that a suitable superposition of those constraints is the generator of the infinitesimal transformations of the time coordinate t x0 and serves as the Hamiltonian which gives the correct equations of motion. Besides that, the system satisfies the mass shell constraint, pμ pμ - m2 = 0, which is the generator of the worldsheet reparametrizations, where the momenta pμ, μ=0,1,2,3, generate infinitesimal changes of the particle's position Xμ in spacetime. Consequently, the Hamiltonian contains p0, which upon quantization becomes the operator - i ∂/∂ T, occurring on the r.h.s. of the Wheeler-DeWitt euqtion. Here the role of time has the particle coordinate X0 T, which is a distinct concept than the spacetime coordinate x0 t. It is also shown how the ordering ambiguities can be avoided if a quadratic form of the momenta is cast into the form that instead of the metric contains the basis vectors.