FTAAN, Session 12

A one-dimensional superstring may be swivel-shaped when it is just Imaginarily Yau-Exact or that one-dimensional superstring may be swivel-shaped when it is tachyonic. A two-dimensional superstring may be swivel-shaped in one and/or two dimensions when it is just Imaginarily Yau-Exact, or when it is tachyonic. A one-dimensional superstring may only be swivel-shaped normal to the holomorphic and antiholomorphic plane. A two-dimensional superstring may be swivel-shaped in the holomorphic or antiholomorphic directions, or these two-dimensional superstrings may be swivel-shaped normal to the radial metric of the topology of the given two-dimensional superstring. A one-dimensional superstring has swivel-shapes that are sequentially normal to the holomorphic plane, then normal to the antiholomorphic plane starting from the bottom of the one-diensional superstring to the top when it is tachyonic. A tachyonic two-dimensional superstring has swivel-shapes that are sequentially holomorphic/antiholomorphic, normal inward to the radial metric of the topology of the given two-dimensional superstring, normal outward to the radial metric of the topology of the given two-dimensional superstring. These sequences are spacial sequences and not time-oriented or multiplicitly substringular metric sequences. With two-dimensional sequences, start at 0 pi and go counterclockwise back to 0 pi. This is taken from a holomorphicly-oriented perspective. When a swiveled superstring is not tachyonic, it may be abelian or non-abelian, depending on the topology of the associated light-cone-gauge eigenstates. Yet, tachyonic swivel-shaped superstrings are always non-abelian.