voudon: difference between revisions
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#* {{quote-journal|en|last=Valkova-Jarvis|first=Zlatka|last2=Poulkov|first2=Vladimir|last3=Stoynov|first3=Viktor|last4=Mihaylova|first4=Dimitriya|last5=Iliev|first5=Georgi|title=A Method for the Design of Bicomplex Orthogonal DSP Algorithms for Applications in Intelligent Radio Access Networks|journal=Symmetry|publisher=MDPI AG|volume=14|issue=3|year=2022|issn=2073-8994|doi=10.3390/sym14030613|passage=According to the logic of doubling the dimensions on which Cayley–Dickson algebra is built, after quaternions the so-called 8D octonions (<math>\mathbb O</math>—Octonions) can be obtained, followed by 16D sedenions, 32D pathions, 64D chingons, 128D routons, and 256D voudons.}} |
#* {{quote-journal|en|last=Valkova-Jarvis|first=Zlatka|last2=Poulkov|first2=Vladimir|last3=Stoynov|first3=Viktor|last4=Mihaylova|first4=Dimitriya|last5=Iliev|first5=Georgi|title=A Method for the Design of Bicomplex Orthogonal DSP Algorithms for Applications in Intelligent Radio Access Networks|journal=Symmetry|publisher=MDPI AG|volume=14|issue=3|year=2022|issn=2073-8994|doi=10.3390/sym14030613|passage=According to the logic of doubling the dimensions on which Cayley–Dickson algebra is built, after quaternions the so-called 8D octonions (<math>\mathbb O</math>—Octonions) can be obtained, followed by 16D sedenions, 32D pathions, 64D chingons, 128D routons, and 256D voudons.}} |
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#* {{quote-journal|en|year=2023|publisher=CEUR Workshop Proceedings|title=Quantum Intelligence: Responsible Human-AI Entities|work=AAAI 2023 Spring Symposia, Socially Responsible AI for Wellbeing, March 27–29, 2023, USA|author=Melanie Swan; Renato P. dos Santos|doi=10.48550/arXiv.math/0603281|passage=There is no theoretical limit to multispace dimensional numbering as there are definitions for octonion (8D), sedenion (16D), pathion (32D), chingon (64D), routon (128D), and voudon (256D) numbered space.}} |
#* {{quote-journal|en|year=2023|publisher=CEUR Workshop Proceedings|title=Quantum Intelligence: Responsible Human-AI Entities|work=AAAI 2023 Spring Symposia, Socially Responsible AI for Wellbeing, March 27–29, 2023, USA|author=Melanie Swan; Renato P. dos Santos|doi=10.48550/arXiv.math/0603281|passage=There is no theoretical limit to multispace dimensional numbering as there are definitions for octonion (8D), sedenion (16D), pathion (32D), chingon (64D), routon (128D), and voudon (256D) numbered space.}} |
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====Synonyms==== |
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* {{l|en|ducentiquinquagintasexion}} |
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====See also==== |
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Revision as of 09:51, 10 October 2024
English
Etymology 1
See voodoo.
Noun
voudon (uncountable)
- Alternative form of voodoo
Anagrams
Etymology 2
Noun
voudon (plural voudons)
- (mathematics) A 256-dimensional hypercomplex number.
- 2002, Robert P. C. de Marrais, “Flying Higher Than a Box-Kite: Kite-Chain Middens, Sand Mandalas, and Zero-Divisor Patterns in the 2n-ions Beyond the Sedenions”, in arXiv[1], , page 7:
- Following the convention adopted by Tony Smith, who has called the 28-ions Voudons after the 256 deities of the Ifa pantheon of Voodoo or Voudon
- 2022, Zlatka Valkova-Jarvis, Vladimir Poulkov, Viktor Stoynov, Dimitriya Mihaylova, Georgi Iliev, “A Method for the Design of Bicomplex Orthogonal DSP Algorithms for Applications in Intelligent Radio Access Networks”, in Symmetry, volume 14, number 3, MDPI AG, , →ISSN:
- According to the logic of doubling the dimensions on which Cayley–Dickson algebra is built, after quaternions the so-called 8D octonions (—Octonions) can be obtained, followed by 16D sedenions, 32D pathions, 64D chingons, 128D routons, and 256D voudons.
- 2023, Melanie Swan, Renato P. dos Santos, “Quantum Intelligence: Responsible Human-AI Entities”, in AAAI 2023 Spring Symposia, Socially Responsible AI for Wellbeing, March 27–29, 2023, USA, CEUR Workshop Proceedings, :
- There is no theoretical limit to multispace dimensional numbering as there are definitions for octonion (8D), sedenion (16D), pathion (32D), chingon (64D), routon (128D), and voudon (256D) numbered space.
