Orbifolds kinematically differetiate with each other in an orbifold eigenset -- the manner of such an interaction, of which, tends to happen in such a manner in so that the cohomological stratum that is formed by the physical memory of the activity of such eluded-to sets of one or more orbifolds, that come together in so as to operate to form one specific function, happens in a Real Reimmanian tense of a viable mappable tracing -- over a sequential series of iterations of respective group-related instantons. This general tense of format is what tends to be the case, unless the physically-based mappable tracing that may be correlative to such a case, is to, instead, happen in a Njenhuis-based manner -- over time. Any Rham-associated genus of a cohomological stratum, is to happen over a Lagrangian-based path that is of a Real Reimmanian-based nature -- when such a depiction of such a cohomological-based stratum is to be mapped-out, over a given arbitrary respective Fourier Transformation. Also, as well, any given arbitrary respective tense of a Rham-based cohomological stratum will tend to not bear any Chern-Simmons singularities (neither of a Lagragian-based nature, nor, of a metrical-based nature, over time) -- as the mappable tracing of such a general tense of a correlative cohomological stratum, is formed by the projection of the trajectory of the kinematic motion of the activity of phenomenology, that is of a substringular nature. The condition of orbifolds or orbifold eigensets -- that exist in such a manner, in so that these so-stated sets of superstrings, that operate in so as to perform one specific group function -- to where such a group-based operation is to here happen over a relative Real-Remmanian-based plane (thisis even if such a correlative cohomological-based stratum that is thus formed is, instead, or a Doubolt-based nature, rather than of a Rham-based nature), may be described, in part, by a tendency that may be postulative as what is known of as the BPS Theorem.
I will continue with the suspense later! To Be Continued! Sincerely, Sam Roach.
No comments:
Post a Comment