Dimensionality of Oribifolds

When a space that exists in the form of an orbifold moves through a discrete Lagrangian as a space that remains in the same general format of covariantly-based Real Reimmanian Gaussian symmetry, then, over the course of the corresponding Fourier Transformation in which such a given arbitrary space is moving over the eluded to time-frame, the said space is traveling consistently here in the same universe during the said duration. Yet, such a space as I have been discussing here may often enter perturbative fields in which the said orbifold may enter and/or leave levels of dimensionality that involve respectively more or less numbers of spatial dimensions. The genus of universe that a space or an orbifold is existent in does not work to define the number of dimensions that the said space is moving in as a specific condition in and of itself. Likewise, the genus of universe that a space or an orbifold is existent in does not work to define the specific format of dimensionality that the said space is moving in as a specific condition in and of itself. What genus that a given arbitrary space is moving in, over a specific given Fourier Transformation that here directly involves the timewise motion of an orbifold that is traveling through a Lagrangian in order to operate to perform a specific function, is based upon the format of the norm-based conditions of the directly corresponding discrete units of energy impedance that work to comprise the impedance of the said orbifold -- when in relation to the alterior formats of the norm-based conditions of the directly corresponding discrete units of energy impedance that work to comprise the impedance of the orbifolds that spatially surround the initially mentioned orbifold. This may not be a complete enough explaination for many to understand, yet, this is the beginning of a dialogue that we may work upon in order to better understand a solution to such questions. Sincerely, Sam Roach.