Retarded Causal Set Propagator in 2D Anti de-Sitter Spacetime

We investigate the viability of Causal Set Theory (CST) as a framework for discretizing $(1+1)$-dimensional anti-de Sitter spacetime (AdS$_{1+1}$). In CST, spacetime is modeled as a locally finite, partially ordered set that reflects the causal structure of events. This fundamentally discrete perspective has shown promise in flat spacetime scenarios, while its application to curved geometries is a current field of study. We address this by studying the retarded scalar field propagator on causal sets generated by Poisson sprinkling in AdS$_{1+1}$. We first show the solution of the continuum propagator using the Klein-Gordon equation, solved in terms of geodesic distance. On the discrete side, we employ Shumans path sum method to derive the corresponding propagator, emphasizing that it is valid even in curved manifolds. By performing numerical simulations, we compare the discrete propagator to its continuum counterpart across various curvature scales. Our results show strong agreement and confirm that the causal set propagator accurately captures the effects of curvature without requiring modifications to the flat-space jump amplitudes. These findings affirm the robustness of CST in approximating field propagation in curved spacetimes and strongly support the ability of causal sets to fully capture the geometry of Lorentzian manifolds.