Classification of non-Riemannian doubled-yet-gauged spacetime

Abstract

Assuming O(D,D) covariant fields as the `fundamental' variables, Double Field Theory can accommodate novel geometries where a Riemannian metric cannot be defined, even locally. Here we present a complete classification of such non-Riemannian spacetimes in terms of two non-negative integers, (n,n), 0≤ n+n≤ D. Upon these backgrounds, strings become chiral and anti-chiral over n and n directions respectively, while particles and strings are frozen over the n+n directions. In particular, we identify (0,0) as Riemannian manifolds, (1,0) as non-relativistic spacetime, (1,1) as Gomis-Ooguri non-relativistic string, (D-1,0) as ultra-relativistic Carroll geometry, and (D,0) as Siegel's chiral string. Combined with a covariant Kaluza-Klein ansatz which we further spell, (0,1) leads to Newton-Cartan gravity. Alternative to the conventional string compactifications on small manifolds, non-Riemannian spacetime such as D=10, (3,3) may open a new scheme of the dimensional reduction from ten to four.