Part Three of the Seventh Session of Course 17 About the Ricci Scalar

Since world-sheets are a template for a form of topology, known of as ghost anomalies, these -- to some extent -- may be able to be effected by any directly affiliated gravitational pull that is enacted upon them.  Such a gravitational pull happens via the Ricci Scalar -- on account of the physical holonomic phenomenon known of as the Rarita Structure.  Cohomologies are integrable sets of one or more ghost anomalies that are both codeterminable and covariant.  World-Sheets are the projection of the trajectory of superstrings, as the so-eluded-to superstrings are kinematically differentiable over time.  So, ghost anomalies that are of a completely hermitian nature, in so as to form hermitian cohomologies -- whether such cohomologies are of a Real Reimmanian and/or of a Njenhuis nature -- completely bear a tense of integrated singularity, that works to pull the correlative ghost-based indices, that work to comprise the said respective given arbitrary cohomology.  This happens in such a manner, that the given cohomological entity that is here being discussed may act as a physical memory of both the existence and the activity of a Calabi-Yau manifold.  If, instead, the cohomology bears some sort of a Doubolt nature, then, this may happen in such a manner, that the given cohomological entity that is here being discussed may act a as physical memory of both the existence and the activity of either a Calabi-Wilson-Gordon manifold, or, a Calabi-Calabi manifold.  This is as the said cohomology is differentially integrable, as a kinematically vibrating whole -- over time.  If the said cohomology is purely of a Real Reimmanian nature, then, the respective cohomology is of a Rham-based cohomological index.  Yet, if the said cohomology has a bearing that is off of the relative Real Reimmanian Plane, then, the respective cohomology is of a Doubolt nature.  The gravitational pull of the Ricci Scalar upon ghost-based indices -- in so as to pull the multiplicit cohomologies that exist -- in the relative directoral topological sway of the correlative gravitons and gravitinos, that work to form the directly associated eigenstates of gravitational force -- works as a Njenhuis directed physical entity of holonomic substrate, in so as to cause enough of a bearing of gravitational permittivity, so that the superstringular impedance that exists due to the correlative Fadeev-Popov-Ghosts (that are the physical memories as to both the existence and the activity of the correlative Fadeev-Popov-Trace eigenstates), may be able to occur spontaneously over time.  I will continue with the suspense later!  Sam Roach.