Self-Referential Noise and the Synthesis of Three-Dimensional Space

Reginald T. Cahill; Christopher M. Klinger (Department of Physics,; Flinders University)

arXiv:gr-qc/9812083·gr-qc·June 25, 2015

Self-Referential Noise and the Synthesis of Three-Dimensional Space

Reginald T. Cahill, Christopher M. Klinger (Department of Physics,, Flinders University)

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TL;DR

This paper proposes that self-referential noise in systems can lead to the emergence of three-dimensional space, offering a novel non-geometric model for universe formation based on intrinsic randomness.

Contribution

It introduces a new non-geometric order-disorder model driven by self-referential noise to explain the emergence of three-dimensional space.

Findings

01

Three-dimensional space can arise from self-referential noise.

02

Self-referential systems contain intrinsic randomness as suggested by mathematical results.

03

A non-geometric model can explain the universe's spatial structure.

Abstract

Generalising results from Godel and Chaitin in mathematics suggests that self-referential systems contain intrinsic randomness. We argue that this is relevant to modelling the universe and show how three-dimensional space may arise from a non-geometric order-disorder model driven by self-referential noise.

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