Anime is just as canon as the manga we don’t have the one is the more canon than the other problem
your example is flawed, and applying it to this situation is impossible (in my opinion)
try to expand the characters to infinity on the page without blending or mixing them together
The analogy isn’t claiming that a finite sheet can hold infinitely many finite drawings. It’s illustrating that objects can have the same dimensionality as the space containing them. Whether there are finitely many or infinitely many of them is a separate issue.
In mathematics, a 4D space can contain infinitely many distinct 4D regions without requiring a fifth dimension. For example, the real number line (1D) contains infinitely many disjoint intervals, each of which is also 1D. Likewise, a 2D plane contains infinitely many disjoint 2D open sets, and the same principle extends to 4D.
Infinity does not automatically imply a higher dimension. An infinite 1D line is still 1D, and an infinite 4D manifold is still 4D. The question is whether an additional independent coordinate is needed to describe the arrangement. If every region can be specified using the same four coordinates, then the ambient space remains 4D.
also a 5D structure is
beyond infinitely larger then a 4D structure and my example assumes a finite amount of 2D structures with in a larger finite structure. If you extend to infinity then you can also have larger infinitely extending surface hosting that infinite
like a three-dimensional book that contains two-dimensional pages without any blending
The “3D book containing 2D pages” analogy works because the pages are separated along a third spatial dimension. That demonstrates an example where the container has a higher dimension than the objects it contains.
But that doesn’t establish a general rule that a container must always have a higher dimension than its contents. There are many mathematical examples where spaces of the same dimension contain multiple distinct spaces or regions of that same dimension.
Likewise, the objection about “expanding the characters to infinity” concerns how much room there is, not how many dimensions there are. Dimension is determined by the number of independent coordinates needed to describe points in the space, not by whether the space contains finitely or infinitely many regions.
To prove a 5D container, you’d need evidence that the 4D spaces are separated by an additional independent axis—just as the pages in a book are separated by the third dimension. Simply containing multiple (or even infinitely many) 4D spaces doesn’t demonstrate that. It only demonstrates multiplicity, not an extra dimension.