EQUIVALENCE OF MASSIVE PROPAGATOR DISTANCE AND MATHEMATICAL DISTANCE ON GRAPHS

It is shown that the assignment of distance according to the massive propagator method and according to the mathematical definition (length of minimal path) on arbitrary graphs with a bound on the degree leads to equivalent large scale properties of the graph. Especially, the internal scaling dimension is the same for both definitions. This result holds for any fixed, non-vanishing mass, so that a really inequivalent definition of distance requires the limit m --> 0.