Local equivalence of some maximally symmetric (2,3,5)-distributions III: An-Nurowski surface rolling on a plane

Abstract

We consider the maximally symmetric (2,3,5)-distribution given by the An-Nurowski circle twistor bundle over the product of an An-Nurowski surface and the plane. This circle twistor distribution encodes the configuration space of an An-Nurowski surface rolling without slipping or twisting on the plane. We calculate the vector fields associated to this maximally symmetric (2,3,5)-distribution that define a split g2 Lie algebra and by projection we obtain an action of SL(3,R) on the submanifold R2× S1 (the configuration space without a surface).