Enumerability principle of itofazpaths: Difference between revisions

;The [[enumerability principle of itofazpaths]] is a combination of the [[enumerability principle]] and the [[itofazpath concept]]. As a result the [[enumerability principle of itofazpaths]] can be applied to each type of itofazpath. Thus getting over 152 sub groups such as [[enumerability principle of oriawarepaths]] or [[enumerability principle of vitoneuropaths]]. There are many uses for this principle. For instance, there are an infinite amount different [[awarepaths]] with the same [[ixperiencitness]]. The simple proof is that as few as two different [[fazmoments]] can be ordered in an infinite amount of unique ways in an infinitely long fazpath. If we consider an infinite amount of infinitely long fazpaths made of just two fazmoments we have made a [[real number infinite]] amount of fazpaths. However, fazpaths are supposed to be the length of a life time or a finite length. There is no law that says that fazpaths have to be finite in length. The real infinite is infinitely larger than the counting infinite. [[Enumerability principle of itofazpaths]] does not state that there are a real infinite amount of [[itofazpaths]] just a counting infinite amount. We can make a one to one correspondence between each [[natural number]] and one unique [[itofazpath]] that is not infinitely long. Adding just one [[fazmoment]] to each [[fazpath]] makes an fazpath different from the previous shorter fazpath. This doubles the amount of fazpaths since there are two unique fazmoments that can be added to the end of the each awarepath. For every counting natural number a finite length fazpath can be named by it or have a one to one correspondence to it.

See also: [[proof of the enumerability principle of itofazpaths]], [[superimmortality]], [[awaretheory]] [[ixperiencitness]] [[consciousness]]