Laplacian-Based Cyclic Permutations

Cyclic permutations that are of a Laplacian-based genus, may be either Lagrangian-based cyclic permutations and/or Contour-based cyclic permutations.  Here is an example of a Laplacian-based cyclic permutation:  Let us say that one is to make a theoretical "snapshot" of one substringular "fret," that is to exist here in the substringular.  Let us next say that one is to examine one given arbitrary cohomological mappable-tracing -- when in terms of the here given arbitrary substringular pattern, over a set Lagrangian-based path.  Let us next say that the here just mentioned cohomological mappable-tracing, is to work to form an iterative pattern -- of which is to have a very minor change at the start of each increment of the so-stated iterative pattern.  This is non-time-oriented.  This is just as if you were to just observe the so-eluded-to "snapshot," as if time and kinematic motion were to have stood still -- as you were to trace the so-eluded-to cohomological mappable-tracing.  If the overall pattern that is to here be "mapped," is to reiterate at some less of a scalar magnitude of devulging, then, the so-eluded-to cyclic permutative mapped Lagrangian-based path -- is to be of a convergent nature.  Yet, if instead, the overall pattern that is to here be "mapped," is to not reiterate at some less of a scalar magnitude of devulging, then, the so-eluded-to cyclic permutative mapped  Lagrangian-based path -- is to be of a divergent nature.  I will continue with the suspense later!  To Be Continued!  Samuel David Roach.