Expectation values of minimum-length Ricci scalar

Abstract

In this paper, we consider a specific model, implementing the existence of a fundamental limit distance L0 between (space or time separated) points in spacetime, which in the recent past has exhibited the intriguing feature of having a minimum-length Ricci scalar R(q) that does not approach the ordinary Ricci scalar R in the limit of vanishing L0. R(q) at a point has been found to depend on the direction along which the existence of minimum distance is implemented. Here, we point out that the convergence R(q) R in the L0 0 limit is anyway recovered in a relaxed or generalized sense, which is when we average over directions, this suggesting we might be taking the expectation value of R(q) promoted to be a quantum variable. It remains as intriguing as before the fact that we cannot identify (meaning this is much more than simply equating in the generalised sense above) R(q) with R in the L0 0 limit, namely when we get ordinary spacetime. Thing is like if, even when L0 (read here the Planck length) is far too small to have any direct detection of it feasible, the intrinsic quantum nature of spacetime might anyway be experimentally at reach, witnessed by the mentioned special feature of Ricci, not fading away with L0 (i.e. persisting when taking the 0 limit).