Tendency Of Genus Of Lagrangian-Based Flow

When any given arbitrary orbifold eigenset is moving -- in whatever the general tendency of holomorphicity as to the directoral-based flow of its integrative eigenindices happens to be moving through, as a Fourier-based Hamiltonian operator that is being delineated in a kinematic manner, over time, the tendency of its motion will be in so as to move through its respective given arbitrary Hamiltonian operand -- in a best-fit mean Lagrangian path.  So, if an orbifold eigenset is initially moving in the relative forward-holomorphic direction, in a best-fit Lagrangian path -- as it is moving through its respective correlative Hamiltonian operand, over the so-eluded-to directly corresponding group-related metric, while then its Lagrangian-based delineation is to all of the sudden spontaneously alter -- in so as to work to form a Ward-supplemental shift in its homotopic covariance, in so as to cause the said orbifold eigenset to then reverse its general tendency of holomorphic-based flow, as a Hamiltonian operator that is to then bear an antiholomorphic Kahler condition -- then, as the so-stated orbifold eigenset is reversed in so as to the relative direction that is to here be considered as the relative holomorphic direction, the general directoral-based flow of the mappable tracing, as to what is now to be the extrapolatable best-fit mean Lagrangian-based path -- will then, in general, be of the reversal of the initial mapping of the holomorphic-based flow of which the so-stated orbifold eigenset had initially worked to bear, before the so-eluded-to Chern-Simons singularities that may be attributed to the reversal of the Fourier-based motion of the said orbifold eigenset, were made Yukawa to the Gliosis-based topological stratum of the so-stated orbifold eigenset -- that would here be at the Poincare level to the core-field-density of the said orbifold eigenset.  I will continue with the suspense later!  Samuel Roach.  To Be Continued!