Holographic Approach to Power Towers: Arnold-Moroz Phase Tuning

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Holographic Approach to Power Towers: Arnold-Moroz Phase Tuning | Authorea try { document.documentElement.classList.add('js'); } catch (e) { } var _gaq = _gaq || []; _gaq.push(['_setAccount', 'G-8VDV14Y67G']); _gaq.push(['_trackPageview']); (function() { var ga = document.createElement('script'); ga.type = 'text/javascript'; ga.async = true; ga.src = ('https:' == document.location.protocol ? 'https://ssl' : 'http://www') + '.google-analytics.com/ga.js'; var s = document.getElementsByTagName('script')[0]; s.parentNode.insertBefore(ga, s); })(); Skip to main content Preprints Collections Wiley Open Research IET Open Research Ecological Society of Japan All Collections About About Authorea FAQs Contact Us Quick Search anywhere Search for preprint articles, keywords, etc. Search Search ADVANCED SEARCH SCROLL This is a preprint and has not been peer reviewed. Data may be preliminary. 1 April 2026 V1 Latest version Share on Holographic Approach to Power Towers: Arnold-Moroz Phase Tuning Author : Rodolfo Carneiro Moroz 0009-0007-7014-552X [email protected] Authors Info & Affiliations https://doi.org/10.22541/au.177507197.74216101/v1 31 views 31 downloads Contents Abstract Supplementary Material Information & Authors Metrics & Citations View Options References Figures Tables Media Share Abstract O número de Graham é famoso por ser o limite superior do resultado de um problema matemático real e por ser um dos maiores números já descobertos, sua existência e conceito desafiam a compreensão. Existe pouco trabalho sendo feito com intuito de aprofundar o conhecimento sobre esse número pois o seu valor para aplicações, mesmo matemáticas, é limitado. O intuito deste trabalho é ir no caminho oposto, enfrentar o caos aritmético e a pseudoaleatoriedade, analisando estruturas de composição deste número de forma a entender melhor seu ponto central e, por consequência seu topo. Este trabalho vai usar como ferramentas uma composição de análise p-ádica, análise de Fourier, órbitas de Arnold e outros parâmetros de simetria para escalar ao topo da torre de potências. Serão apresentados exemplos numéricos da abordagem, bem como as conclusões observadas. Supplementary Material File (artigo_graham.pdf) Download 235.65 KB Information & Authors Information Version history V1 Version 1 01 April 2026 Copyright This work is licensed under a Non Exclusive No Reuse License. Keywords arnold's orbits graham's number p-adic fourier transform power towers trans-computational number Authors Affiliations Rodolfo Carneiro Moroz 0009-0007-7014-552X [email protected] View all articles by this author Metrics & Citations Metrics Article Usage 31 views 31 downloads .FvxKWukQNSOunydq8rnd { width: 100px; } Citations Download citation Rodolfo Carneiro Moroz. Holographic Approach to Power Towers: Arnold-Moroz Phase Tuning. Authorea . 01 April 2026. DOI: https://doi.org/10.22541/au.177507197.74216101/v1 If you have the appropriate software installed, you can download article citation data to the citation manager of your choice. Simply select your manager software from the list below and click Download. For more information or tips please see 'Downloading to a citation manager' in the Help menu . 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last seen: 2026-05-20T01:45:00.602351+00:00