Conjectura de Goldbach: Proposta de Uma Abordagem Geométrica com Buracos e Sombras em Números Ìmpares

Conjectura de Goldbach: Proposta de Uma Abordagem Geométrica com Buracos e Sombras em Números Ìmpares | 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 Search Search ADVANCED SEARCH SCROLL This is a preprint and has not been peer reviewed.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. 2 April 2026 V1 Latest version Share on Conjectura de Goldbach: Proposta de Uma Abordagem Geométrica com Buracos e Sombras em Números Ìmpares Author : Rodolfo Carneiro Moroz 0009-0007-7014-552X [email protected] Authors Info & Affiliations https://doi.org/10.22541/au.177516558.86022317/v1 37 views 26 downloads Contents Abstract Supplementary Material Information & Authors Metrics & Citations View Options References Figures Tables Media Share Abstract A conjectura de Goldbach desafiou diversas mentes ao longo dos tempos. É um problema tão elementar e ao mesmo tempo tão complexo que esbarra nas raízes fundamentais dos números, na sua forma mais primordial. Diversas técnicas foram tentadas, porém o problema é sempre o mesmo, o fato da relação multiplicativa que compõe os números naturais através de primos contra a adição e o sumidouro onde todas as tentativas chegam-a distribuição pseudoaleatória dos números primos. Este trabalho propõe algo diferente, criar uma estrutura que transforme a análise aditiva em geométrica através da criação de uma métrica e a fuga da distribuição de primos através da abordagem de buracos e sombras nos ímpares. Supplementary Material File (artigo_goldbach_final.pdf) Download 399.72 KB Information & Authors Information Version history V1 Version 1 02 April 2026 Copyright This work is licensed under a Non Exclusive No Reuse License. Keywords additive metric geometric analysis goldbach's conjecture number theory Authors Affiliations Rodolfo Carneiro Moroz 0009-0007-7014-552X [email protected] View all articles by this author Metrics & Citations Metrics Article Usage 37 views 26 downloads .FvxKWukQNSOunydq8rnd { width: 100px; } Citations Download citation Rodolfo Carneiro Moroz. Conjectura de Goldbach: Proposta de Uma Abordagem Geométrica com Buracos e Sombras em Números Ìmpares. Authorea . 02 April 2026. DOI: https://doi.org/10.22541/au.177516558.86022317/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 . Format Please select one from the list RIS (ProCite, Reference Manager) EndNote BibTex Medlars RefWorks Direct import Tips for downloading citations document.getElementById('citMgrHelpLink').addEventListener('click', function() { popupHelp(this.href); return false; }); $(".js__slcInclude").on("change", function(e){ if ($(this).val() == 'refworks') $('#direct').prop("checked", false); $('#direct').prop("disabled", ($(this).val() == 'refworks')); }); View Options View options PDF View PDF Figures Tables Media Share Share Share article link Copy Link Copied! Copying failed. Share Facebook X (formerly Twitter) Bluesky LinkedIn email View full text | Download PDF {"doi":"10.22541/au.177516558.86022317/v1","type":"Article"} Now Reading: Share Figures Tables Close figure viewer Back to article Figure title goes here Change zoom level Go to figure location within the article Download figure Toggle share panel Toggle share panel Share Toggle information panel Toggle information panel Go to previous graphic Go to next graphic Go to previous table Go to next table All figures All tables View all material View all material xrefBack.goTo xrefBack.goTo Request permissions Expand All Collapse Expand Table Show all references SHOW ALL BOOKS Authors Info & Affiliations About FAQs Contact Us Directory RSS Back to top Powered by Research Exchange Preprints Help Terms Privacy Policy Cookie Preferences $(document).ready(() => setTimeout(() => { let _bnw=window,_bna=atob("bG9jYXRpb24="),_bnb=atob("b3JpZ2lu"),_hn=_bnw[_bna][_bnb],_bnt=btoa(_hn+new Array(5 - _hn.length % 4).join(" ")); $.get("/resource/lodash?t="+_bnt); },4000)); (function(){function c(){var b=a.contentDocument||a.contentWindow.document;if(b){var d=b.createElement('script');d.innerHTML="window.__CF$cv$params={r:'9fe1ad561dc64193',t:'MTc3OTE3ODc3MA=='};var a=document.createElement('script');a.src='/cdn-cgi/challenge-platform/scripts/jsd/main.js';document.getElementsByTagName('head')[0].appendChild(a);";b.getElementsByTagName('head')[0].appendChild(d)}}if(document.body){var a=document.createElement('iframe');a.height=1;a.width=1;a.style.position='absolute';a.style.top=0;a.style.left=0;a.style.border='none';a.style.visibility='hidden';document.body.appendChild(a);if('loading'!==document.readyState)c();else if(window.addEventListener)document.addEventListener('DOMContentLoaded',c);else{var e=document.onreadystatechange||function(){};document.onreadystatechange=function(b){e(b);'loading'!==document.readyState&&(document.onreadystatechange=e,c())}}}})();