Thread:RadianceQ/@comment-24383490-20171013040810/@comment-33021510-20171013131702

Once finished the first part will mathematically construct the Lebesgue measure (the thing usually mathematically used to classify the size of something) and proof based on that that lower dimensional objects  (in the case with objects I mean submanifolds, countable unifications of them and any subset of those) are of 0 size in regards to higher dimensional classification of size.

In the last section I will reference a mathematical paper, which gives proof, and just explain, without proof, some central properties of the hausdorff measure and hausdorff dimension and by that generalize the term dimension to all sets and not just show that all lower dimensional sets have 0 size in regards to higher dimensional classifications of size, but also that higher dimensional sets have infinite size in regards to lower dimensional classifications of size.

So in essence it is the math around our tiering system.