Session 14 Of Course 12

Two-Dimensional superstrings iterate during the metric of group instanton at the same time as one-dimensional strings iterate over the metric of group instanton.  Two-Dimensional superstrings and their directly related Planck-like phenomena work to comprise the respective discrete energy permittivity and discrete energy impedance that makes up part of any given arbitrary bosonic sub-atomic particle.  Bosons have a whole spin.  Two-Dimensional superstrings ideally iterate as basically circular-based vibrating hoops.  Yet, usually, two-dimensional strings are in a vibratorial state that involves permutations that at least partially form at least some aberration from the condition of these having the shape of a basically circular tense of a vibrating hoop.  Two-dimensional superstrings iterate in a harmonically vibratoiral manner during the course of the general metric of group instanton.  Yet, the said bosonic superstrings (two-dimensional strings) vibrate in an anharmonic vibratorial manner during the generally unnoticed portion of Ultimon Flow.  The series of anharmonic vibrations that a two-dimensional bosonic string bears over the generally unnoticed portion of Ultimon Flow works to integrate -- over the activity of a sequential series of pulsation -- into what becomes a harmonic vibratorial oscillation over the course of noticed Ultimon Flow.  This is in part due to that the here given arbitrary anharmonics of bosonic strings that happens in-between successive durations of group instanton forms an integrative kinematic pattern that works to form the harmonic vibratorial oscillation that bosonic strings exhibit during group instanton.  This tendancy helps to allow the directly related parity of the said bosonic strings to give the said strings their condition of having a whole spin.  The integrated harmonic oscillations of one-dimensional strings during the generally unnoticed portion of Ultimon Flow -- when combined with their tendancy to have anharmonic vibratorial oscillations during the course of group instanton -- forms a sequential series of vibration indices that forms an overall anharmonic vibratorial oscillation mode, that, works to correspond these said fermionic strings to bear a general parity of having a fractional spin.  Harmonic oscillation during group instanton gives the subatomic particles that are based upon a bosonic tendancy to have a whole spin.   This is while anharmonic oscillation during group instanton given the subatomic particles that are based upon a fermionic tendancy to have a fractional spin.  Both two and one-dimensional superstrings always exhibit some form of vibration at all points during the iteration of both group instanton, and, also during the generally unnoticed portion of Ultimon Flow.  The point particles of two-dimensional strings and also of one-dimensional strings always fluctuate from their neighborhoods to some extent or another during the Ultimon Flow that happens in-between individual durations of group instanton.  In this sense, the point particles of superstrings separate a little bit during the prior said general condition of metric.  Yet, the fractals of both the respective current and of the magnetic field of a given substringular setting -- the spin-orbital Hamiltonian operators that directly correspond to the kinematic activity of discrete energy via the Fourier-based differentiation of the respective superstrings and Planck-like phenomena -- always remain in some tense of semblance in so long as such a general format of operational index is not frayed.  I will continue with the suspense later!  Sam Roach.