The emergence of a single Möbius strip with a torsion
We find that the space in which we are bound to navigate with emergence or these generating tangents is what Rene' Guenon calls "Qualified Space",
a space "determined and differentiated by its directions ... and which is the real space."
Thus sending the border to infinity is equivalent to its absence in real space; it is deduced that the Möbius Band, through emergence,
has turned into a surface without any edge / frontier, metamorphosing into a Projective Plan, which, in Euclidean space is only achievable by the
self-intersection of the face.
Beyond the self-intersection of the face, rays or generating tangents continue their trajectory in the virtual space, all flowing to infinity.
Maybe we can talk about megaspace?
In the case of the Möbius with a torsion, illustrated in fig. 7.147, in each opened cell appear two open accounts adjacent, contiguous and divergent.
Following what happens with the tangents-generators, metamorphosed in the arrows that we force to glide on the Möbius Strip, we notice that the external
face turns into the inner face, the direction of the arrows is reversed, the sending to infinity has been stopped in volleyball, and animate the various
colorful routes. Finding escape points and graphic construction is the secret of the operation.