FTAAN, Session 3

Anti-Cevita energy is energy that causes a perturbative physical substringular state to become non-perturbative. A Wess-Zumino conditions is a condition of a substringular state that is non-perturbative. A Cevita condition is a physical condition of a substringular state that is perturbative. A Cevita conditions is mapped via the multi-dimensional euclidean cartesian tying together of the substringular Poincaires that define the substringular region that is given. The given Cevita energy is varied through the region of the neighborhood of the differentiation of the given substringular phenomena that acts as the given substringular states. The Ward conditions of the Ceivita energy that are referred to here are the topological vibrations of where the substringular states were defines the ghost anomallies related to the differential existence of the substringular states. These ghosts may be mapped as I referred to before by Poincaire extrapolation, and one may then define the existence and neighborhood of light-cone-gauge ghosts, ghosts of singularities, ghosts of world-sheets, ghosts of Planck phenomenon related phenomena, ghosts counterstrings, and/or ghost of superstrings. Ghosts of Planck phenomena related phenomena are mapped out as Fadeev-Popov-Ghosts and there are ghosts of superstrings. Fadeev-Popov-Ghosts are more easily measurable during Wess-Zumino conditions since strings here are non-perturbative. When substringular states are under conformal invariance, the superstrings given are steady state, and one may detect a Fadeev-Popov-Ghost by mapping it and then by going convex to concave to discern a set of iterations of a substriingular phenomenon that appears torroidal because of the set of vibrations that define the detection of that given substringular phenomena.