Timeline for What are Santilli's isonumbers?
Current License: CC BY-SA 2.5
7 events
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| Jun 17, 2015 at 1:56 | comment | added | Geremia | Here's a recent, thorough, formal introduction: Ganfornina, Raúl M. Falcón, and Juan Núñez Valdés. “Mathematical Foundations of Santilli Isotopies.” Translated by Alan Aversa. Algebras, Groups, and Geometries 32 (2015): 135–308. | |
| Mar 17, 2015 at 3:59 | comment | added | Geremia | @BugsBunny Here's his 1993 paper: R. M. Santilli, "Isonumbers and Genonumbers of Dimensions 1, 2, 4, 8, their Isoduals and Pseudoduals, and Hidden Numbers of Dimension 3, 5, 6, 7" Algebras, Groups and Geometries Vol. 10, 273 (1993). | |
| Feb 21, 2011 at 12:52 | history | edited | Pete L. Clark | CC BY-SA 2.5 |
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| Nov 28, 2010 at 15:58 | comment | added | Federico Poloni | I found his papers with a couple of friends when I was an undergrad and we had some fun browsing through them. If I interpret his "disproof" of the Riemann hypothesis correctly, he starts using the definition $\zeta(s)=\Prod(1-\frac{1}{p^s})$ as if it converged for $\Re(s)<1$, makes a lot of estimates, and concludes that $|\zeta(s)|>C$ for a nonzero constant $C$ --- but, of course, he gets that because the series he is using as a definition is not convergent. | |
| Jul 26, 2010 at 19:34 | history | edited | Pete L. Clark | CC BY-SA 2.5 |
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| Jul 26, 2010 at 19:23 | comment | added | Bugs Bunny | I have read Jiang's book today and this is a definite quackery. I have managed to google fprotheory.com/showthread.php?p=206 He seems to be some kind of "mathematician of the people" in China:-)) I wish I could get hold of Santilli's 1993 paper in Algebras, Groups and Geometries... | |
| Jul 26, 2010 at 16:32 | history | answered | Pete L. Clark | CC BY-SA 2.5 |