Group-Attractors And Yau-Exact Orbifold Eigensets

When a group-attractor interacts with an orbifold eigenset -- that is initially to work to bear a Dolbeault cohomology, that is thence to not be of a fully hermitian nature, -- it will then tend to cause such an orbifold eigenset, to alter into the direction of subsequently working to bear a potentially De Rham cohomology; to where this will furthermore work to cause the said orbifold eigenset, that is here to then potentially to be exhibiting such a said De Rham cohomology, to work to bear a more Yau-Exact nature, over an ensuing discrete evenly-gauged Hamiltonian eigenmetric.  (Which will then tend to happen, over an eluded-to ensuing sequential series of group-related instantons.)  To Be Continued!  Sincerely, Samuel David Roach.