Relativistic Propagators on Lattices
Abstract
I define the lattice propagator on a very general collection of graphs, namely graphs locally isomorphic to Zd× Z. I then define polygonal approximations to the minkowski metric and define a corresponding lattice propagator for these. I show in d=1, as suggested by the metric approximation, the continuum limit of the polygonal propagators converges to the Klien Gordon Propagator. Finally, I obtain the taxicab polygonal propagator in a very general collection of spaces, including Td, the Klein bottle, and a discretization of de-Sitter space.
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