Fuzz Balls

An orbifold, when described in one set locus, is a Laplacianly integrated set of superstrings that function as a unit and obey Gaussian Symmetry.
When described as a "fuzz-ball" in one set locus, a "fuzz-ball" is a Laplacian conglomeration of frayed superstringular material that is perturbative within the non-linear/inexact sub-Fourier codifferentiation that is within the described "fuzz-ball", and does not obey a Gaussian Symmetry. The difference between an orbifold and a "fuzz-ball" is that an orbifold differentiates as one unit and is thus not internally perturbative, an orbifold consists of integrative superstrings while a "fuzz-ball" may consist of conglomerative superstrings and/or gauge-actions, and orbifolds obey Gaussian Supersymmetry while a "fuzz-ball" does not obey Gaussian Symmetry. An orbifold may differentiate in a conformally invariant manner, while a "fuzz-ball" is transient in arrangement as one set unit and does not maintain a topological invariance beyond a transient period of group metric. "Fuzz-Balls" are single units of frayed substringular mesh that partake of a black-hole.
Orbifolds undergo Gaussian Transformation when these differentiate as orbifolds, while "fuzz-balls" become unsewn by norm projections, at the exit end of black-holes, that work to redelineate the associated superstrings so that these superstrings will reorganize into orbifolds. Some newly formed orbifolds have superstrings, that just came from a locus of a "fuzz-ball" that was just spit out of a black-hole, that will immediately go into a Gaussian Transformation so that the associated superstrings will attain the permittivity that these need to remain as energy. Once an orbifold is established as a Gaussian matrix or membrane, then the Gaussian Transformations that follow will occur based upon the Clifford index of perturbation, which is euclideanly oriented with the associated Hodge Index of the given orbifold and Diracly oriented with the degree of Cassimer Invariance that acts upon the given orbifold. Perturbation upon an orbifold increases the spontaneity and frequency of the associated Gaussian Transformations. Such perturbations are generally interialized Yakawa interactions, interialized Gliossi wave, energy, and mass interactions, exterialized Yakawa interactions, Ricci Scalar redirectoralizations and changes in the amplitude of the given Ricci Scalar, and the interaction of interialized and exterialized and convergent Schwinger-Indices upon an orbifold's field, and the redistribution and the redirectoralization of norm-states and/or their projections.