Applied foliated conformal Carroll symmetries

Abstract

We apply the conformal compensating technique for constructing matter couplings to conformal scalars on a D-dimensional foliated conformal Carroll manifold dividing the tangent space into (p+1)-dimensional longitudinal and (D-p-1)-dimensional transversal directions corresponding to p-branes. We show that the conformal Carroll algebra that was used for particle-like foliated geometries with p=0 cannot be used for higher-dimensional objects, called p-branes, with 0 < p D-2. Furthermore, string-like foliated geometries are not suitable for the conformal compensating technique due to the conformal invariance in the longitudinal directions that is present for p=1. All other cases can be dealt with provided one uses a different conformal extension of the Carroll algebra that amounts to a conformal extension in the longitudinal directions only supplemented with an additional an-isotropic dilatation. By brane-duality similar results hold for foliated Galilean geometries which we present as well. Our results nicely fit in with recent work on foliated Aristotelian geometries.