Working Paper Article Version 2 This version is not peer-reviewed

Geometric State Sum Models from Quasicrystals

Version 1 : Received: 1 April 2021 / Approved: 1 April 2021 / Online: 1 April 2021 (16:20:57 CEST)
Version 2 : Received: 7 September 2021 / Approved: 9 September 2021 / Online: 9 September 2021 (11:08:57 CEST)

A peer-reviewed article of this Preprint also exists.

Amaral, M.; Fang, F.; Hammock, D.; Irwin, K. Geometric State Sum Models from Quasicrystals. Foundations 2021, 1, 155-168. Amaral, M.; Fang, F.; Hammock, D.; Irwin, K. Geometric State Sum Models from Quasicrystals. Foundations 2021, 1, 155-168.

Journal reference: Foundations 2021, 1, 11
DOI: 10.3390/foundations1020011

Abstract

In light of the self-simulation hypothesis, a simple form implementation of the principle of efficient language is discussed in a self-referential geometric quasicrystalline state sum model in three dimensions. Emergence is discussed in context of geometric state sum models.

Keywords

self-simulation hypothesis; principle of efficient language; quasicrystals; game of life; emergence; state sum models

Subject

PHYSICAL SCIENCES, General & Theoretical Physics

Comments (1)

Comment 1
Received: 9 September 2021
Commenter: Marcelo Amaral
Commenter's Conflict of Interests: Author
Comment: We improved the English grammar and addressed some question from reviewers for the first version such as the difinition of empire and the rules. We added a new reference for a look-ahead algorithm used.
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