Small scale structure of spacetime: van Vleck determinant and equi-geodesic surfaces

Abstract

It has recently been argued that if spacetime M possesses non-trivial structure at small scales, an appropriate semi-classical description of it should be based on non-local bi-tensors instead of local tensors such as the metric gab. Two most relevant bi-tensors in this context are Synge's World function (p,p0) and the van Vleck determinant (VVD) (p,p0), as they encode the metric properties of spacetime and (de)focussing behaviour of geodesics. They also characterize the leading short distance behavior of two point functions of the d'Alembartian p0 p. We begin by discussing the intrinsic and extrinsic geometry of equi-geodesic surfaces G,p0 defined by (p,p0)=constant in a geodesically convex neighbourhood of an event p0, and highlight some elementary identities relating the VVD with geometry of these surfaces. As an aside, we also comment on the contribution of G,p0 to the surface term in the Einstein-Hilbert (EH) action and show that it can be written as a volume integral of . We then study the small scale structure of spacetime in presence of a Lorentz invariant short distance cut-off 0 using and , based on some recently developed ideas. We derive a 2nd rank bi-tensor qab which naturally yields geodesic intervals bounded from below, and present a general and mathematically rigorous analysis of short distance structure of spacetime based on (a) geometry of G,p0, (b) structure of the non local d'Alembartian associated with qab, and (c) properties of the VVD. In particular, we show that the Ricci bi-scalar of qab is completely determined by G,p0, the tidal tensor, and first two derivatives of the van Vleck determinant, and has a non-trivial "classical" limit given by (constant) Rab qa qb (see text).