Some Ideas as to Slater Equations

Let us here consider the motion of an orbifold -- an orbifold that moves as a substringular projection through a discrete Lagrangian, over time.  Let us now consider the here present condition, that the so-stated substringular projection works to map-out a cohomological-based projection -- as the physical memory of the orbifold that I have here mentioned is pulled in the relatively holomorphic direction, through the said Lagrangian that the superstring had projected itself through, in so as to form a ghost-based extrapolation as to the what, when, and how the said set of superstrings that are here functioning in so as to perform a specific substringular operation -- in the Ward-Caucy-based confines of the codifferentiablity of the proximally local Poincare-based indices, to the so-eluded-to scenario.  Let us now consider the condition, that, the fractal of the angular momentum -- the Hamiltonian-based permittivity that the so-stated orbifold exhibits, by its here eluded-to substringular behavior -- that the said orbifold works to show, over a discrete period of time, is pulled by an exterial wave-tug.  This genus of a wave-tug-based activity works to exhibit a median-based euclidean expansion of the said orbifold's Hamiltonian-based operand, over the time in which it is moving across the so-stated discrete Lagrangian that I have here mentioned.  This general format of an expanding field of an orbifold, that works to bear a relatively optimum abelian geometry -- in the process of the said orbifold's traverse across that Lagrangian in which it has been moving in, over the here mentioned group-related metric -- will bear an orbifold that is pulled at a subtended angle, through the vantage-point of the here eluded-to coniaxion, that is of a 45 degree-based nature.  If one were to multiply the permittivity of the directly corresponding Hamiltonian, that appertains to the scalar magnitude of such a median eigenbase of a relatively hermitian-based relatively abelian flow of corroberative superstrings, over time,  by the reciprocal of the square-root of two, -- when one here considers the Hodge-Indices that work to depict the initial so-eluded-to Hamiltonian of the so-stated orbifold that we are here dealing with -- this will help to establish what the multiplets of the so-eluded-to Hamiltonian of this case are.  This format of working to determine what such a euclidean-based median substringular expansion may be extrapolated as -- in terms of what the correlative Hamiltonian eigenbase of such a case is.  This is, in general, the idea behind determining what a Slater equation is. To Be Continued!!! I will continue with the suspense later!  Sam Roach.