Part Six of the 13th Session of Course 18 -- the Ricci Sclar and Kaeler Differentiation

The general condition that I had just mentioned in my last post -- as appertaining to the attribute, that a tense of supergravity tends to bear a gauge-symmetry that is, at least, partially Njenhuis to any given arbitrary proximal tense of spin-orbital/radial Hamiltonian-based operational-based holonomic substrate, that is not of a tense of supergravitational-based genus -- of which works to appertain to what may be called the Levi-Cevita condition.  Furthermore, the euler-based propagation of any respective given arbitrary Clifford-based manifold may be described by what may be thought of as the Levita-Cevita equation.  Orbifolds that are kinematically differentiable in a Dirac-based manner, tend to bear a relatively abelian-based interconnectivity, yet, orbifolds that are kinematically differentiable in a hermitian-based manner instead, tend to bear a relatively nonabelian-based interconnectivity.  Often, when there is a high scalar magnitude of supergravity, this just stated attribute often works to form a perturbation in the abelian-based characteristics of any directly corresponding orbifold or orbifold eigenset, that this said supergravity is directly affiliated with.  To Be Continued!  I will continue with the suspense later! Sincerely, Sam Roach.