The supersymmetric components of the Riemann–Einstein tensor as nine dimensional spheres in ten dimensional space

Abstract

In eight dimensional superspace, the number of independent components of the Riemann–Einstein tensor is R(8) = 336. The paper shows that these components could be given a geometrical interpretation as a hyperbolic tesselation via the (k = 11 − 4 = 7) modular group Γ(7). In addition the components may be viewed as 336 particles-like states resembling 9-dimensional spheres in 10 dimensional space. Finally a relation to the 528 killing vector fields in 32 dimensional super and maximally symmetric space related to 11 dimensional P-Branes with 528 = (336)(11/7) states is established.