More About the Wick Action

The Wick Action is an interconnection of Hausendorf States that act as sensors to the condition of the lack of proper norm conditions in a Gaussian substringular membrane, due to the quantification of anharmonic Rarita based vibrations that function through the operand of the holonomics of Cassimer Invariance. So, the Wick Action is a Hausendorf Projection that senses a change in the Jacobian eigenbasis of an orbifold or of an orbifold eigenset. As Gaussian symmetry among a substringular membrane alters in norm conditions, the Wick Action caused by quantific anharmonic second-ordered Schwinger Indices that bear cusps of residue that have covariantly Laplacian reverse symmetric concavity, is signaled to move a holonomic phenomenon known as a Landau-Gisner Action in such a manner that a leverage of mini-string known as a Fischler-Suskind-Mechanism physically move the Higgs Action, that, based on the covariant abelian nature of the angling that bears upon the Klein Bottle, uses its Clifford Geometry to move the Schotky Construction to the appropriate loci (191 in a single series of iterations) to go through Kaeler Metric that is caused by superstrings falling at an angle that is caused by the residual rock-sway of the said superstrings once the directly prior Polyakov and Bette Actions have happened, into the norm conditions of the Klein Bottle and thus be shook a certain amount and in a certain manner per corresponding instanton so that these superstrings may regain permittivity. This shaking is due to the angling of the norm-states within the Schotky Construction being multiplicitly given the Ward Neumman Conditions, being subtended by 22.5 degrees Hilbert based degrees relative to one another. (22.5 degrees is the angle of a norm-state rock sway, and thus also the angle of Minkowski fall of the associated superstrings into the Klein Bottle. The Klein Bottle, when shook, is hermitianly redistributed in a unitarily multiplicit supplemental manner so that it is shook back-and-forth eight times. (8*22.5=180.)

The back-and-forth motion institutes the three-dimensional tensors if the affiliated superstrings, and 180 degrees *2=360 degrees.