Link-based causal set propagators in 1+1 dimensions

Abstract

We investigate whether retarded scalar propagators on causal sets can be expressed in terms of the link matrix L. For Poisson sprinklings into 1+1 dimensional Minkowski spacetime, we show by asymptotic analysis and supporting numerical simulations that the averaged massless retarded propagator is naturally associated with a normalized exponential exp(L). We then extend the construction to the massive case via the usual mass-scattering series and obtain good agreement with the continuum propagator after averaging. Finally, we discuss the inverse kernel exp(-L) as a possible candidate for a discrete d'Alembertian.