Authors: Richard Ruquist
Most theories of everything (TOEs) like string theory are based on physics. But there are as well TOEs based on "mathematics" being fundamental to a reality based on science. In particular, one math-TOE is based on the discrete natural numbers famously used by Godel to derive his Incompleteness Theorems. Such math computational theories (math-comp) assume that the comp-machine has an infinite computation space. Our approach proposes that string cosmology limits comp-space as measured by the Bekenstein Bound/Lloyd Limit of available bits of information in a finite holographic universe. We conjecture that the cubic lattice of Calabi-Yau (CY) compact-manifolds, which pervade the space of each universe, is an arithmetic comp-machine (due to the compact manifolds being enumerable) and furthermore, that its comp-power is limited by the effective holographic size of the universe. Moreover, we conjecture that our universe's comp-machine is insufficiently precise, because of its limited size, to compute physical particles; and for that, a collection of all universes in an effectively infinite metaphysical space called the Metaverse, is necessary. A Metaverse comp-machine in such a large space is effectively complete and consistent. We further argue that all CY computations are instantaneous from a human perspective. These conjectures make possible Mind and Body consciousnesses in a Single-World Universe and a cosmic rebirth loop based on Smolin's Fecund Cosmology with Super-Massive Black Holes (SMBHs) giving birth to Metaverses.
Comments: 11 Pages.
[v1] 2013-03-25 08:28:03
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