More About Indices

A Campbell index is a norm index that helps form the field projection of a superstring. So, the set of norm indices that form the field projection of superstrings are Campbell indices. The group index projection, or, in other words, the eigenbasis of a set of Campbell or Hausendorf indices that form the field projection of a superstring is known as a Hausendorf projection. If a set of indices that form a field projection of a superstring is not of the nature of Campbell or Campbell-Hausendorf norm states by definition, (a Campbell norm state is a group of first-ordered point particles that are that is supplementally norm to a relatively small number of other first-ordered point particles), then the indical states are known as Hausendorf indices. The projection of such indices to induce the field trajectory of a superstring would again be a Hausendorf projection. If a Cambell norm-state, a Campbell-Hausendorf norm-state, or a Hausendorf norm-state of first-ordered point particles (Hausendorf states are neither Campbell norm or ground) is directly attached to a superstring in a cohomology, and all cohomologies are examples of Yakawa couplings, then this borne tangency is composed of Gliossi Indices. Gliossi Indices are often Campbell Indices or Hausendorf indices , yet not all Campbell indices or Hausendorf Indices are Gliossi. Gliossi Indices are connected to Hausendorf projections via substringular fields known as mini-strings. So, many Campbell fields and all Hausendorf fields are comprised of the multiplicit multidirectoralized integration of mini-string Laplacian co-differentiation at an iteration AND their respective Campbell norm and Hausendorf norm states taken Laplacianly at an iteration. The Fourier series integration of such fields forms a webbing of mini-string upon orbifold co-differentiation relative to other of such stratum to help to induce Gaussian Transformations. The untwining of such webbing is an example of Cassimer Invariance.